Yoo can someone help me please and show the work

Yoo Can Someone Help Me Please And Show The Work

Answers

Answer 1

A triangle is a polygon with three sides and three vertices. The triangle's interior angle, which is 180 degrees, is formed.

What is a triangle definition?

Three sides and three vertices make up a triangle, which is a polygon. There is a 180 degree angle created inside the triangle. In other words, a triangle's internal angles add up to 180 degrees.

A closed triangle has 3 sides, 3 angles, and 3 vertices. It is a 2-dimensional shape. Polygons include triangles as well. ABC is a triangle that is depicted in the previous illustration.

An "opposite" side in a right triangle is the one that is across from a specific angle, while a "adjacent" side is the one that is next to a specific angle. The hypotenuse is the longest side in a right triangle.

Therefore, the answer is:

Side LN = 4.33013 = 5√3/2

Side MN = 5

Side c = 2.5

To learn more about triangle refer to:

https://brainly.com/question/1058720

#SPJ1


Related Questions

A unit vector normal to the surface 2x² – 2xy + yx at (2,4) is: a. 1/√5 ( i-2j) . b.1/√5 ( i+2j) c.1/√5 ( 2i+j) d. 1/√5 ( 2i-j)

Answers

The answer is (a) 1/√5 ( i-2j).

We can find the normal vector to the surface by computing the gradient of the surface and evaluating it at the given point.

The surface is given by the equation:

f(x, y) = 2x² - 2xy + yx

Taking the partial derivatives with respect to x and y:

fx = 4x - 2y

fy = x + 2

So the gradient vector is:

∇f(x, y) = (4x - 2y)i + (x + 2)j

Evaluating this at the point (2, 4):

∇f(2, 4) = (4(2) - 2(4))i + (2 + 2)j = 4i + 4j

To get a unit normal vector, we divide this by its magnitude:

|∇f(2, 4)| = √(4² + 4²) = 4√2

n = (4i + 4j)/[4√2] = 1/√2 (i + j)

To find a normal vector that is also a unit vector, we divide by its magnitude again:

|n| = √2

n/|n| = 1/√2 (i + j)

So the answer is (a) 1/√5 ( i-2j).

To know more about vector refer here:

https://brainly.com/question/29740341

#SPJ11

use the derivative f′(x)=(x−2)(x 1)(x 4) to determine the local maxima and minima of f and the intervals of increase and decrease. sketch a possible graph of f (f is not unique).

Answers

The graph will generally exhibit a local maximum at x = 2 and local minima at x = -1 and x = -4

To determine the local maxima and minima of the function f(x) = (x-2)(x+1)(x+4), we can analyze the derivative f'(x). By setting f'(x) equal to zero and solving for x, we can find the critical points of f. The intervals of increase and decrease can be determined by examining the sign of f'(x) in different intervals. Sketching a graph of f can provide a visual representation of its behavior, but it's important to note that the specific shape of the graph may vary.

To find the critical points of f(x), we set f'(x) = 0 and solve for x. In this case, f'(x) = (x-2)(x+1)(x+4). Setting this equal to zero, we find that the critical points are x = 2, x = -1, and x = -4. These are the points where f(x) may have local maxima or minima.

To determine the intervals of increase and decrease, we can examine the sign of f'(x) in different intervals. We can choose test points within each interval and evaluate f'(x) to determine its sign. For example, in the interval (-∞, -4), we can choose x = -5 as a test point. Evaluating f'(-5), we find that f'(-5) < 0, indicating that f(x) is decreasing in this interval. By applying a similar process to the other intervals (-4, -1) and (-1, 2), we can determine the intervals of increase and decrease for f(x).

Sketching a graph of f(x) can help visualize the behavior of the function. However, it's important to note that the specific shape of the graph may vary. The graph will generally exhibit a local maximum at x = 2 and local minima at x = -1 and x = -4, but the curvature and overall shape of the graph will depend on factors such as the scale of the axes and the positioning of the critical points.

Learn more about critical points here;

https://brainly.com/question/32077588

#SPJ11

Evaluate the integral
∫10∫1ysin(x2) dxdy
by reversing the order of integration.
With order reversed,
∫ba∫dcsin(x2) dydx
where a= , b= , c= , and d= .
Evaluating the integral, ∫10∫1ysin(x2) dxdy=

Answers

Reversing the order of integration for the given double integral ∫10∫1ysin(x^2)[tex]dxdy[/tex] leads to the integral ∫1^0∫√y^−1y sin(x^2) dxdy. Evaluating this integral gives the value approximately equal to -0.225.

To reverse the order of integration, we need to visualize the region of integration in the x y -plane. The limits of x are from y to 1 and limits of y are from 0 to 1. So, the region of integration is a triangle with vertices at (1,0), (1,1), and (y, y) for y ranging from 0 to 1.

Now, to reverse the order of integration, we integrate with respect to x first, then y. So, the limits of x will be from √[tex]y^-1[/tex] to y , and limits of y will be from 1 to 0. Therefore, the new integral becomes ∫1^0∫√y^−1y sin(x^2) dxdy.

Evaluating this integral, we have ∫1^0∫√[tex]y^-1y sin(x^2)[/tex][tex]dxdy[/tex] = ∫1^0 [−1/2cos[tex](y^-(1/2))[/tex] + 1/2cos(y)[tex]] dy[/tex] ≈ -0.225. Therefore, the value of the given double integral is approximately -0.225.

Learn more about integral here:

https://brainly.com/question/31109342

#SPJ11

Find the y-intercept of the median-median line for the dataset. x 2,3,4,5,7,8,10,12,16,18,21 Y 1,4,6,3,7,6,10,17,20,21,3

Answers

The y-intercept of the median-median line for the given dataset is -2.25.

The median-median line is a line of best fit that is calculated by dividing the given data set into smaller groups of three points, computing the median of the x and y values in each group, and then finding the line that passes through the two median points. The y-intercept of the median-median line is the value of y when x is zero, which can be found by plugging in x = 0 into the equation of the line.

To know more about median-median line,

https://brainly.com/question/23566540

#SPJ11

use the binomial series to find (6)(0)f(6)(0) term for the ()=1−2⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯√.
(Use decimal notation. Give your answer as whole or exact number.)

Answers

The correct answer is 1/64.The 6th term in the binomial series expansion of f(x) is:(6 choose 6)(-2x^(1/2))^6 = 1/64So.

We can use the binomial series to expand the function f(x) = (1 - 2x^(1/2))^6 as:

f(x) = ∑(k=0 to 6) (6 choose k)(-2x^(1/2))^k

To find the 6th derivative of f(x) with respect to x, we only need to consider the term with k = 0 in this series. All other terms will have a power of x greater than 0, so they will evaluate to 0 when we take the 6th derivative.

So, we have:

f^(6)(x) = (6 choose 0)(-2x^(1/2))^0 = 1

Now, we can evaluate this expression at x = 0 to get the 6th derivative of f(x) at x = 0:

f^(6)(0) = 1.

For such more questions on Binomial series expansion:

https://brainly.com/question/13602562

#SPJ11

The (6)(0) term is the coefficient of x^6, which is 0 since there is no x^6 term in the expansion. Therefore, the answer is 0.

The binomial series for (1+x)^n, where n is a positive integer, is given by:

(1+x)^n = 1 + nx + (n(n-1)/2!) x^2 + (n(n-1)(n-2)/3!) x^3 + ... + (n choose k) x^k + ...

where (n choose k) is the binomial coefficient.

In this case, we have:

f(x) = (1-2x)^(-1/2)

n = -1/2

Using the binomial series, we can expand f(x) as:

f(x) = 1 + (n choose 1) (-2x) + (n+1 choose 2) (-2x)^2 + (n+2 choose 3) (-2x)^3 + ...

f(x) = 1 + (-1/2) (-2x) + (-1/2+1/2)(-2x)^2 + (-1/2+2/2)(-2x)^3 + ...

f(x) = 1 + x + (3/8) x^2 + (15/16) x^3 + ...

Know more about binomial series here:

https://brainly.com/question/30177068

#SPJ11

A triangular parcel of land has borders of lengths 60 meters, 70 meters, and 82 meters. Find the area of the parcel of land.

Answers

Answer:

The area of the triangular parcel of land is approximately 5039.55 square meters. To find the area of the triangular parcel of land, we can use Heron's formula.

Heron's formula states that the area of a triangle with sides of length a, b, and c is Area = √(s(s-a)(s-b)(s-c))
where s is the semiperimeter, defined as:
s = (a + b + c)/2
In this case, we have a = 60 meters, b = 70 meters, and c = 82 meters. So, we can first calculate the semiperimeter:
s = (60 + 70 + 82)/2 = 106
Then, we can use Heron's formula to find the area:
Area = √(106(106-60)(106-70)(106-82)) = √(106(46)(36)(24)) = √(25397184) ≈ 5039.55 square meters.

Learn more about Heron's formula here:

https://brainly.com/question/29184159

#SPJ11

Find dy/dx by implicit differentiation, where 2x^5 + 7x^2y-6xy^5 = -2. dy/dx =

Answers

The value of dy/dx by implicit differentiation is:

[tex](-10x^4 - 14xy^2 + 6y^5)/(7x^2 - 30xy^4).[/tex]

To find dy/dx by implicit differentiation, we differentiate both sides of the given equation with respect to x, treating y as a function of x.

Step-by-step solution:

Differentiating [tex]2x^5 + 7x^2y - 6xy^5 = -2[/tex] with respect to x:

[tex]10x^4 + 14xy^2 + 7x^2(dy/dx) - 6y^5 - 30xy^4(dy/dx) = 0[/tex]

Now, let's isolate the term containing dy/dx:

[tex]7x^2(dy/dx) - 30xy^4(dy/dx) = -10x^4 - 14xy^2 + 6y^5[/tex]

Factoring out dy/dx:

[tex](dy/dx)(7x^2 - 30xy^4) = -10x^4 - 14xy^2 + 6y^5[/tex]

Finally, we can solve for dy/dx by dividing both sides by [tex](7x^2 - 30xy^4):[/tex]

[tex]dy/dx = (-10x^4 - 14xy^2 + 6y^5)/(7x^2 - 30xy^4)[/tex]

Therefore, dy/dx is equal to [tex](-10x^4 - 14xy^2 + 6y^5)/(7x^2 - 30xy^4).[/tex]

To know more about implicit differentiation refer here:

https://brainly.com/question/11887805

#SPJ11

(Will mark brainliest) A box shaped like a rectangular prism is 14. 5 centimeters long, 4 centimeters wide and 3. 5 centimeters high. You have a ruler that is 15 centimeters long and 3 centimeters wide. Can it fit inside this box? EXPLAIN. ​

Answers

To determine if the ruler can fit inside the box, we need to compare the dimensions of the ruler with the dimensions of the box. Let's consider each dimension individually:

Length:

The ruler is 15 centimeters long, which is larger than the length of the box, which is 14.5 centimeters. Therefore, the ruler cannot fit inside the box lengthwise.

Width:

The ruler is 3 centimeters wide, which is smaller than the width of the box, which is 4 centimeters. Therefore, the ruler can fit inside the box widthwise.

Height:

The ruler is 3 centimeters high, which is smaller than the height of the box, which is 3.5 centimeters. Therefore, the ruler can fit inside the box heightwise.

Based on the above analysis, we can conclude that the ruler can fit inside the box widthwise and heightwise, but it cannot fit inside the box lengthwise.

to know about length,visit:

https://brainly.com/question/32060888

#SPJ11

the half-life of cesium-129 is 32.0 hours. how much time is required for the activity of a sample of cesium-129 to fall to 18.0 percent of its original value?

Answers

It would take approximately 71.5 hours for the activity of the sample of cesium-129 to fall to 18.0 percent of its original value.

To calculate the time required for the activity of a sample of cesium-129 to fall to 18.0 percent of its original value, we can use the formula for half-life:

N = [tex]N_{0} \frac{1}{2}^{\frac{t}{T} } }[/tex]

Where N is the remaining activity, N0 is the initial activity, t is the time passed, and T is the half-life.

We know that T = 32.0 hours, and we want to find t when N/N0 = 0.18. So we can rearrange the formula as:

0.18 = [tex]\frac{1}{2}^{\frac{t}{32} } }[/tex]

Taking the logarithm of both sides, we get:

log(0.18) = (t/32)log(1/2)

Solving for t, we get:

t = -32(log(0.18))/log(1/2) = 71.5 hours

Therefore, it would take approximately 71.5 hours for the activity of the sample of cesium-129 to fall to 18.0 percent of its original value.

Know more about   half-life   here:

https://brainly.com/question/25750315

#SPJ11

Use a protractor to measure the angles shown for each given write whether the angleis acute right obtuse or straight

Answers

Right angles are angles that measure 90 degrees. Angle 2 is a right angle. Obtuse angles are angles that measure greater than 90 degrees but less than 180 degrees. Angle 3 is an obtuse angle. It measures approximately 130 degrees.

To measure the angles shown for each given, we need a protractor. A protractor is an instrument used to measure angles. It is a semicircular transparent sheet of plastic or glass with the edges marked from 0 to 180 degrees. To measure the angles, place the center of the protractor on the vertex of the angle.

Align the base line of the protractor with one of the sides of the angle. Determine the size of the angle by reading the number of degrees between the two sides of the angle. Using the angle measurements, we can categorize the angles as acute, right, obtuse or straight angles. Acute angles are angles that measure less than 90 degrees. In the given angles, angles 1 and 4 are acute angles. Angle 1 measures approximately 60 degrees and angle 4 measures approximately 45 degrees.

Right angles are angles that measure 90 degrees. Angle 2 is a right angle. Obtuse angles are angles that measure greater than 90 degrees but less than 180 degrees. Angle 3 is an obtuse angle. It measures approximately 130 degrees. Straight angles are angles that measure 180 degrees. There is no straight angle in the given angles. The measures of the angles using the protractor and the category of each angle are summarized in the table below. Angle Measurement

Category Angle 160 degrees

Acute Angle 290 degrees

Right Angle 3130 degrees

Obtuse Angle 445 degrees

To know more about obtuse angle visit:

https://brainly.com/question/30813354

#SPJ11

Let R be the region in the xy-plane bounded by the lines x + y = 2, x + y = 4, y − x = 3, y − x = 5. Use the change of variables u = y + x, v = y − x to set up (but do not evaluate) an iterated integral in terms of u and v that represents the integral below. Double integral sub R (y−x) e^ (y^ 2−x ^2) dA

Answers

The iterated integral in terms of u and v that represents the given integral is 1/2 times the integral over the region R in the uv-plane of (v) e^((u^2 - v^2)/4) dv du, where R is bounded by the lines u=3^5 and v=2^4.

We are given the region R in the xy-plane bounded by the lines x + y = 2, x + y = 4, y − x = 3, y − x = 5. We need to use the change of variables u = y + x, v = y − x to set up an iterated integral in terms of u and v that represents the integral of (y-x) e^(y^2-x^2) over R.

Using the given change of variables, we have:

x = (u - v)/2

y = (u + v)/2

The Jacobian of the transformation is given by:

|∂(x,y)/∂(u,v)| = |1/2 1/2| = 1/2

Using the change of variables, we can express the integral as:

∫∫(y-x)e^(y^2-x^2) dA = 1/2 ∫u=3^5 ∫v=2^4 (v) e^((u^2 - v^2)/4) dv du

Thus, the iterated integral in terms of u and v that represents the given integral is 1/2 times the integral over the region R in the uv-plane of (v) e^((u^2 - v^2)/4) dv du, where R is bounded by the lines u=3^5 and v=2^4.

Learn more about iterated integral here

https://brainly.com/question/30216057

#SPJ11

The equation of a circle is given below. Identify the radius and the center. Then graph the circle.

Answers

The radius of the circle is 4 units, and the graph can be seen in the image at the end.

How to identify the radius of the circle?

The equation for a circle whose center is (a, b) and the radius is R, is:

(x - a)² + (y - b)² = R²

Here we have the circle equation:

2x² + 14x + 2y² - 4y = 11/2

Divide the whole equation by 2 to get:

x² + 7x + y² - 2y = 11/4

Now we can complete squares, we need to add:

3.5² and (-1)² in both sides, so we will get:

(x² + 2*3.5*x + 3.5²) + (y² - 2y +  (-1)²) = 11/4 + 3.5² + (-1)²

(x + 3.5)² + (y - 1)² = 16 = 4²

So the radius is 4, and the graph is on the image below.

Learn more about circles at:

https://brainly.com/question/25871159

#SPJ1

Question

Find the surface area of the prism. The surface area is

square feet

Answers

To find the surface area of a prism, we need to calculate the sum of the areas of all its faces.

For a general prism, the surface area can be found by adding the areas of the lateral faces and the base faces.

If we assume that the prism has a rectangular base, the surface area can be calculated using the following formula:

Surface Area = 2lw + 2lh + 2wh

Where:

l = length of the prism

w = width of the prism

h = height of the prism

the specific dimensions (length, width, and height) of the prism so that I can calculate the surface area for you.

Learn more about prism area here:

https://brainly.com/question/1297098

#SPJ11

{ Let X ~ Np(μ,V) with V nonsingular, and let U = XTAX for A symmetric. a. Show that the mgf for U is mu (1) = 11-2t AVI-1/2expl_2Wv-1- b. Show that ifAps = 0, then mu (t) = 11-2tAVI-12.

Answers

The mgf reduces to mu(t) = (1 - 2t)^(p/2) det(I - 2tAV^(1/2))^(1/2),

which is the mgf of a chi-squared distribution with p degrees of freedom and scale parameter AV^(1/2).

To find the moment generating function (mgf) of U = XTAX, we first note that X follows a multivariate normal distribution with mean μ and covariance matrix V. Thus, we can write X = μ + Z, where Z ~ Np(0, V).

Using this expression for X, we have U = XTAX = (μ + Z)TA(μ + Z) = ZTAZ + 2μTAZ + μTAμ.

Since Z has a normal distribution, ZTAZ has a chi-squared distribution with p degrees of freedom. Thus, the mgf of ZTAZ is given by

M(t) = E[exp(tZTAZ)] = (1 - 2t)^(p/2) det(I - 2tV^(1/2)AV^(1/2))^(1/2),

where det denotes the determinant of a matrix.Next, we note that μTAZ has a normal distribution with mean 0 and covariance matrix μTAV. Thus, the mgf of μTAZ is given by

M1(t) = E[exp(tμTAZ)] = exp(tμTAμ/2) det(I - 2tAV^(1/2))^(1/2).

Using these expressions, we can find the mgf of U as follows:

mu(t) = E[exp(tU)] = E[exp(tZTAZ + 2tμTAZ + tμTAμ)]

= M(t) * M1(t)

= (1 - 2t)^(p/2) det(I - 2tV^(1/2)AV^(1/2))^(1/2) * exp(tμTAμ/2) det(I - 2tAV^(1/2))^(1/2)

Now, suppose that Aps = 0, i.e., A is orthogonal to the subspace spanned by the columns of V. In this case, we have AV^(1/2) = 0 and hence det(I - 2tV^(1/2)AV^(1/2)) = 1. Moreover, we have μTAμ = μTAVμ = 0 since Aps = 0. Thus, the mgf reduces to

mu(t) = (1 - 2t)^(p/2) det(I - 2tAV^(1/2))^(1/2),

which is the mgf of a chi-squared distribution with p degrees of freedom and scale parameter AV^(1/2).

For such more questions on chi-squared:

https://brainly.com/question/4543358

#SPJ11

The motion of a particle is given by x=Asin^3(wt). a) What is the amplitude of the particles's motion? b)What is the expression for the particle's velocity? c) What is the expression for the particle's acceleration?

Answers

The amplitude of the particle's motion is A.

The expression for the particle's velocity can be found by taking the time derivative of x with respect to t:

v = [tex]dx/dt = 3A(w sin(wt))^2[/tex] [tex]cos(wt)c)[/tex]

The expression for the particle's acceleration can be found by taking the time derivative of v with respect to t:

[tex]a = dv/dt = -3A(w^2 sin^2(wt) - 2w^2 sin^4(wt)) sin(wt) - 6A(w sin(wt))^3[/tex] [tex]cos(wt)[/tex]

a) The amplitude of the particle's motion is the maximum displacement from its equilibrium position, which can be found by taking the absolute value of the maximum value of x. In this case, the maximum value of x is A, so the amplitude of the particle's motion is A.

b) The expression for the particle's velocity can be found by taking the time derivative of x with respect to t:

v = [tex]dx/dt = 3A(w sin(wt))^2[/tex] [tex]cos(wt)c)[/tex] The expression for the particle's acceleration can be found by taking the time derivative of v with respect to t:

[tex]a = dv/dt = -3A(w^2 sin^2(wt) - 2w^2 sin^4(wt)) sin(wt) - 6A(w sin(wt))^3[/tex] [tex]cos(wt)[/tex]

Simplifying this expression gives:

[tex]a = -3Aw^2 sin(wt) [1 - 2sin^2(wt)] - 6Aw^3 sin^3(wt) cos(wt)[/tex]

For such more questions on acceleration

https://brainly.com/question/26408808

#SPJ11

The amplitude of the particle's motion is A, the expression for the particle's velocity is v = 3Awcos(wt) * w, and the expression for the particle's acceleration is a = -3Aw^2sin(wt).

These expressions describe the behavior of the particle in terms of its position, velocity, and acceleration as a function of time.

a) The amplitude of the particle's motion can be determined from the equation x = Asin^3(wt). In this equation, A represents the amplitude. Therefore, the amplitude of the particle's motion is A.

b) To find the expression for the particle's velocity, we need to differentiate the equation x = Asin^3(wt) with respect to time. Taking the derivative, we get:

v = d/dt (Asin^3(wt))

Using the chain rule and the derivative of sine function, we can simplify the expression as follows:

v = 3Awcos(wt) * w

Therefore, the expression for the particle's velocity is v = 3Awcos(wt) * w.

c) To find the expression for the particle's acceleration, we need to differentiate the velocity equation with respect to time. Taking the derivative, we get:

a = d/dt (3Awcos(wt) * w)

Using the chain rule and the derivative of cosine function, we can simplify the expression as follows:

a = -3Aw^2sin(wt)

Therefore, the expression for the particle's acceleration is a = -3Aw^2sin(wt).

To learn more about velocity, click here: https://brainly.com/question/10425898

#SPJ11

The position of a particle moving in the xy-plane is given by the parametric equations x(t) = cos(2') and y(t) = sin(2) for time t 2 0. What is the speed of the particle when t = 2.3 ? (A) 1.000 (B) 2.014 (C) 3.413 (D) 11.652

Answers

The speed of the particle when t = 2.3 is approximately 2.014, which corresponds to option (B).


1. We are given the parametric equations x(t) = cos(2t) and y(t) = sin(2t).
2. To find the speed, we need to find the magnitude of the velocity vector, which is given by the derivative of the position vector with respect to time.
3. Differentiate x(t) and y(t) with respect to time, t:

  dx/dt = -2sin(2t)
  dy/dt = 2cos(2t)

4. Now, find the magnitude of the velocity vector, which is the speed:

  Speed = √((dx/dt)^2 + (dy/dt)^2)

5. Substitute the values of dx/dt and dy/dt, and plug in t = 2.3:

  Speed = √((-2sin(2*2.3))^2 + (2cos(2*2.3))^2)

6. Calculate the speed:

  Speed ≈ 2.014

The speed of the particle when t = 2.3 is approximately 2.014, which is option (B).

To learn more about equations visit:

https://brainly.com/question/10413253

#SPJ11

The correct option is (B) 2.014 .  The speed of particle when t = 2.3 is approximately 2.014,

To find the speed of the particle when t = 2.3, we need to calculate the derivative of the parametric equations with respect to time and then find the magnitude of the velocity vector.

The given parametric equations are x(t) = cos(2t) and y(t) = sin(2t).

First, find the derivatives with respect to time t:
dx/dt = -2sin(2t) and dy/dt = 2cos(2t).

Next, we'll find the magnitude of the velocity vector at t = 2.3:
|v(t)| = √((dx/dt)^2 + (dy/dt)^2).

Substitute t = 2.3 into the derivatives:
dx/dt = -2sin(2*2.3) and dy/dt = 2cos(2*2.3).

Now, find the magnitude:
|v(2.3)| = √((-2sin(4.6))^2 + (2cos(4.6))^2).

Calculate the values:
|v(2.3)| = √(((-2sin(4.6))^2 + (2cos(4.6))^2) ≈ 2.014.

Therefore, the speed of the particle when t = 2.3 is approximately 2.014, which corresponds to option (B).

Know more about the parametric equations

https://brainly.com/question/30451972

#SPJ11

What is the probability that the mean salary of random sample of 100 workers is no more than $54,215?

Answers

Using the normal distribution calculator, the probability that the mean salary of random sample of 100 workers is no more than $54,215 is  0.5171 or 51.71%.

What is the probability?

Probability refers to the chance or likelihood that an expected event occurs out of many possible events.

Probability gives a value that lies between 0 and 1, depending on the degree of certainty.

Mean annual salary = $54,000

Standard deviation = $5,000

Sample size = 100 workers

Mean not above $54,215

Thus, the probability that the mean salary of random sample of 100 workers is no more than $54,215 is 0.5171.

Learn more about normal distribution probabilities at brainly.com/question/4079902.

#SPJ1

Complete Question:

The annual salary for a certain job has a normal distribution with a mean of $54,000 and a standard deviation of $5000. What is the probability that the mean salary of a random sample of 100 workers is no more than $54,215?

An urn contains7green and 8red balls. Five balls are randomly drawn from the urn in succession, with replacement. That is, after each draw, the selected ball is returned to the urn. What is the probability that all 5 balls drawn from the urn are red? Round your answer to three decimal places

Answers

The probability that all 5 balls drawn from the urn are red is 0.069 (approximately).

The number of balls in the urn = 7 green + 8 red = 15 ballsThere are 5 balls drawn from the urn in succession, with replacement. That is, after each draw, the selected ball is returned to the urn. Thus, the probability that each of the 5 balls drawn is red can be found as follows;Probability of drawing a red ball on any draw = 8/15Probability of drawing 5 red balls = P(Red, Red, Red, Red, Red)= (8/15) * (8/15) * (8/15) * (8/15) * (8/15)= (8/15)^5= 0.0693Rounding to three decimal places.

The probability of drawing all 5 balls red is 0.069. Therefore, the probability that all 5 balls drawn from the urn are red is 0.069 (approximately).

Learn more about Succession here,

https://brainly.com/question/1824935

#SPJ11

Evaluasi integral garis F · dr, C di mana C diberikan oleh fungsi vektor r(t). f(x,y,z) = (x y^2)i xz(j) (y z)k, r(t)=t^2i t^3j-2tj, 0<=t<=2

Answers

The line integral evaluates to 1792/3. The integral was solved using the parametric equations of the given vector function and applying the line integral formula.

The line integral of F · dr over C, where C is given by the vector function r(t) = t²i + t³j - 2tj, 0 ≤ t ≤ 2, and F(x, y, z) = (xy²)i + xz(j) + (yz)k is to be evaluated.

To solve this, first, we need to parameterize the curve C by finding the values of r(t) at t = 0 and t = 2.

At t = 0, r(0) = (0)i + (0)j + (0)k = 0

At t = 2, r(2) = (4i) + (8j) - (2k)

Next, we need to calculate the line integral using the parameterization of the curve C.

∫ F · dr = ∫ [f(r(t))] · [r'(t) dt] from t=0 to t=2

where r'(t) is the derivative of r(t) with respect to t.

Substituting the given values of F and r(t), we get

∫ F · dr = ∫ [(t²)(t⁶)²i + (t²)(-2t)j + (t³)(-2t)(t²)k] · [2ti + 3t²j - 2j dt] from t=0 to t=2

On simplifying and integrating, we get

∫ F · dr = ∫ [(t¹⁰)i + (-4t³)j + (-2t⁵)k] · [2ti + 3t²j - 2j dt] from t=0 to t=2

∫ F · dr = ∫ [(2t¹¹) + (-12t⁵) + (-2t⁵)] dt from t=0 to t=2

∫ F · dr = [1/6 (2t¹²) - 2t⁶ - 1/3 (2t⁶)] from t=0 to t=2

∫ F · dr = [(2/3)(2¹²) - 2(2⁶) - (2/3)(2⁶)] - [0]

∫ F · dr = 2048/3 - 128 - 64/3

∫ F · dr = 1792/3

Therefore, the value of the line integral is 1792/3.

To know more about line integral:

https://brainly.com/question/29850528

#SPJ4

what is the probability of a goal given that wayne took the shot?

Answers

The probability of a goal given that Wayne took the shot would depend on various factors,

To determine the probability of a goal given that Wayne took the shot, we would need to know the success rate of Wayne's shots.

If we have that information, we can use it to calculate the conditional probability of a goal.

For example,

If we know that Wayne has a 20% success rate on his shots, then the probability of a goal given that Wayne took the shot would be 0.2 (or 20%).

The probability of a goal given that Wayne took the shot would depend on various factors, such as Wayne's skill level, the position he took the shot from, the opposition team's defense, the weather conditions, and many other factors.

If you have more information about these factors or any other relevant details, please provide them, and I will try my best to help you with the calculation.

However,

If we don't have any information on Wayne's success rate, it would be difficult to calculate the probability accurately.

For similar question on probability:

https://brainly.com/question/32004014

#SPJ11

Divide 6 sqrt5cis (11pi/6) by 3 sqrt6cis (pi/2)

Answers

The quotient of the expression is (√30 / 3) cis (4π / 3).

Let's break down the given expressions into their magnitude and angle components:

Expression 1: 6√5cis(11π/6)

Magnitude: 6√5

Angle: 11π/6

Expression 2: 3√6cis(π/2)

Magnitude: 3√6

Angle: π/2

Now, let's apply the division rule:

Step 1: Divide the magnitudes:

6√5 ÷ 3√6

To divide the magnitudes, we divide the values under the square roots:

(6/3) * (√5/√6) = 2 * (√5/√6)

We can simplify this expression further by rationalizing the denominator. To rationalize, we multiply both the numerator and the denominator by the conjugate of the denominator (√6):

(2 * (√5/√6)) * (√6/√6) = (2√5 * √6) / (√6 * √6)

= (2√30) / 6

= √30 / 3

So, the magnitude component of the quotient is √30 / 3.

Step 2: Subtract the angles:

(11π/6) - (π/2)

To subtract the angles, we need a common denominator:

(11π/6) - (3π/6) = (11π - 3π) / 6 = 8π / 6

To simplify the angle, we divide the numerator and denominator by their greatest common divisor (2):

(8π / 6) ÷ (2/2) = (4π / 3)

So, the angle component of the quotient is 4π / 3.

Step 3: Combine the magnitude and angle components:

The quotient is given by (√30 / 3) cis (4π / 3).

To know more about expression here

https://brainly.com/question/14083225

#SPJ4

let f be a quasiconcave function. argue that the set of maximizers of f is convex.

Answers

We have shown that any point on the line segment connecting two maximizers of f is also a maximizer. This implies that the set of maximizers is convex.

If f is a quasiconcave function, it means that for any two points in the domain of f, the set of points lying above the curve formed by f is a convex set. This implies that the set of maximizers of f is also convex.

To see why, suppose there are two maximizers of f, say x and y. Since f is quasiconcave, any point on the line segment connecting x and y lies above the curve formed by f.

Now, if there exists a point z on this line segment that is not a maximizer, we can construct a new point by moving slightly towards the maximizer. By the definition of quasiconcavity, this new point will also lie above the curve formed by f.
To learn more about : maximizer

https://brainly.com/question/18521060

#SPJ11

A function is quasiconcave if its upper level sets are convex. Let's assume that f is a quasiconcave function and let M be the set of maximizers of f. To show that M is convex, we need to show that if x and y are in M, then any point on the line segment between them is also in M.

A quasiconcave function f has the property that for any two points x, y in its domain, f(min(x, y)) ≥ min(f(x), f(y)). The set of maximizers contains all points in the domain where f achieves its maximum value.

To show that this set is convex, consider any two points x, y within the set of maximizers. Let z be any point on the line segment connecting x and y, such that z = tx + (1-t)y for t ∈ [0,1]. Since f is quasiconcave, f(z) ≥ min(f(x), f(y)). However, both f(x) and f(y) are maximum values, so f(z) must also be a maximum value.

Suppose x and y are in M, which means that f(x) = f(y) = c, where c is the maximum value of f. Since f is quasiconcave, its upper level set {z | f(z) ≥ c} is convex. Therefore, any point on the line segment between x and y is also in this set, which means that it maximizes f as well. Therefore, z is in the set of maximizers, proving the set is convex. Hence, M is convex.

Learn more about quasiconcave here: brainly.com/question/29641786

#SPJ11

let f (x) = [infinity] xn n n=1 and g(x) = x3 f (x2/16). let [infinity] anxn n=0 be the taylor series of g about 0. the radius of convergence for the taylor series for f is

Answers

The radius of convergence for the Taylor series of g(x) is 4.

To find the radius of convergence for the Taylor series of f(x) = ∑(n=1 to ∞) xn, we can use the ratio test.

The ratio test states that for a power series ∑(n=0 to ∞) an(x-c)n, the series converges if the following limit exists and is less than 1:

lim(n→∞) |an+1(x-c)/(an(x-c))|

For the series f(x) = ∑(n=1 to ∞) xn, we have an = 1 for all n.

Applying the ratio test to f(x), we have:

lim(n→∞) |(x(n+1))/(xn)|

= lim(n→∞) |x(n+1)/xn|

= |x|

For the series to converge, |x| < 1. Therefore, the radius of convergence for the Taylor series of f is 1.

Now, let's consider the function g(x) = x^3 * f(x^2/16). Since f(x) has a radius of convergence of 1, we need to determine the radius of convergence for g(x) based on f(x^2/16).

To find the radius of convergence for g(x), we substitute x^2/16 into the ratio test:

lim(n→∞) |[(x^2/16)^(n+1)] / [(x^2/16)^n]|

= lim(n→∞) |(x^2/16)|

= |x^2/16|

For g(x) to converge, |x^2/16| < 1. Simplifying the inequality, we have |x| < 4.

Know more about Taylor series here:

https://brainly.com/question/29733106

#SPJ11

150. G of aluminum chloride in 0. 450 liters of solution, what is the concentration? (any examples are helpful, thank you)

Answers

The concentration of a solution can be defined as the quantity of solute per unit volume of the solution. It can be represented in various units such as molarity (moles of solute per liter of solution), normality (number of equivalent weights of solute per liter of solution), and molality (moles of solute per kilogram of solvent).

The concentration of a solution can be defined as the quantity of solute per unit volume of the solution. It can be represented in various units such as molarity (moles of solute per liter of solution), normality (number of equivalent weights of solute per liter of solution), and molality (moles of solute per kilogram of solvent). Here, we have been given 150 g of aluminum chloride in 0.450 liters of solution and we need to find its concentration. The first step in finding the concentration of a solution is to determine the number of moles of solute present in it. The molar mass of aluminum chloride is 133.34 g/mol. Hence, the number of moles of aluminum chloride present in the given solution is: 150 g / 133.34 g/mol = 1.125 mol

Now, we can calculate the concentration of the solution using the formula: Concentration = Number of moles of solute / Volume of solution in liters= 1.125 mol / 0.450 L= 2.50 M

Therefore, the concentration of the given solution of aluminum chloride is 2.50 M. The solution to the given problem is as follows. We have been given 150 g of aluminum chloride in 0.450 liters of solution, and we need to find its concentration. The concentration of a solution is defined as the amount of solute per unit volume of the solution, and it can be expressed in different units such as molarity, molality, and normality. The molarity of a solution is the number of moles of solute per liter of solution. Hence, the first step in finding the concentration of the given solution is to determine the number of moles of aluminum chloride present in it. We can do this by dividing the given mass of aluminum chloride by its molar mass. The molar mass of aluminum chloride is the sum of the atomic masses of aluminum and chlorine, which is 26.98 + 2 x 35.45 = 133.34 g/mol.

Therefore, the number of moles of aluminum chloride present in the given solution is: 150 g / 133.34 g/mol = 1.125 mol. Now, we can calculate the molarity of the solution using the formula: Molarity = Number of moles of solute / Volume of solution in liters. Hence, the molarity of the given solution is: 1.125 mol / 0.450 L = 2.50 M. Therefore, the concentration of the given solution of aluminum chloride is 2.50 M.

To know more about molality visit:

https://brainly.com/question/30640726

#SPJ11

two point charges are located on an x axis; one is at the -1 cm mark and the other is at the 2 cm mark. what is the direction of the net electric field of these two charges at x=0?

Answers

The net electric field will point to the left, in the direction of E2.

To find the direction of the net electric field of two point charges at the origin, we need to consider the direction of the electric fields due to each charge and add them as vectors.

Assuming both charges are positive (or both negative), the electric field due to each charge points away from it. The magnitude of the electric field due to a point charge Q at a distance r from it is given by Coulomb's law:

E = kQ/r^2,

where k is the Coulomb constant (k = 9 × 10^9 N·m^2/C^2).

At x = 0, the electric field due to the charge at -1 cm (which we'll call Q1) points to the right and has a magnitude of:

E1 = kQ1/(-0.01)^2

At x = 0, the electric field due to the charge at 2 cm (which we'll call Q2) points to the left and has a magnitude of:

E2 = kQ2/(0.02)^2

To find the net electric field at x = 0, we need to add the electric fields due to each charge as vectors. Since the electric fields due to the two charges have equal magnitude, we can simply subtract them as vectors. The direction of the net electric field will be the direction of the resulting vector.

The vector subtraction of the two electric fields can be represented as:

E_net = E2 - E1

where the positive sign of E1 implies that its direction is opposite to E2.

Substituting  values of E1 and E2, we get:

E_net = k[(Q2/0.02^2) - (Q1/0.01^2)]

Since Q2 is farther from the origin than Q1, its electric field has a greater magnitude. Therefore, the net electric field will point to the left, in the direction of E2.

To know more about net electric field refer here:

https://brainly.com/question/11974397

#SPJ11

What is the age distribution of patients who make office visits to a doctor or nurse? The following table is based on information taken from a medical journal.Age group, years Under 15 15-24 25-44 45-64 65 and olderPercent of office visitors 10% 5% 25% 10% 50%Suppose you are a district manager of a health management organization (HMO) that is monitoring the office of a local doctor or nurse in general family practice. This morning the office you are monitoring has eight office visits on the schedule. What is the probability of the following?a. At least half the patients are under 15 years old.b. From 2 to 5 patients are 65 years old or older (include 2 and 5).

Answers

a. To calculate the probability that at least half the patients are under 15 years old, we need to find the probability of having 4 or more patients under 15 years old.

According to the table, the probability of a patient being under 15 years old is 10%, so the probability of having 4 or more patients under 15 years old can be calculated using the binomial distribution formula:

P(X >= 4) = 1 - P(X < 4) = 1 - (C(8,0)*0.1^0*0.9^8 + C(8,1)*0.1^1*0.9^7 + C(8,2)*0.1^2*0.9^6 + C(8,3)*0.1^3*0.9^5) = 1 - 0.9897 = 0.0103

Therefore, the probability of at least half the patients being under 15 years old is 0.0103 or about 1.03%.

b. To calculate the probability of having 2 to 5 patients who are 65 years old or older, we use the binomial distribution formula.

From the binomial distribution formula, probability of having exactly 2, 3, 4, or 5 patients who are 65 years old or older are found and then the probabilities are added up:

P(2 ≤ X ≤ 5) = P(X = 2) + P(X = 3) + P(X = 4) + P(X = 5)

= C(8,2)*0.5^2*0.5^6 + C(8,3)*0.5^3*0.5^5 + C(8,4)*0.5^4*0.5^4 + C(8,5)*0.5^5*0.5^3

= 0.1094 + 0.2734 + 0.2734 + 0.1367 = 0.7939

Therefore, the probability of having 2 to 5 patients who are 65 years old or older is 0.7939 or about 79.39%.

To know more about probability, visit:

https://brainly.com/question/30034780

#SPJ11

can someone solve for x?
x^3 = -81

Answers

The value of x in the expression is,

⇒ x = - 3

Since, Mathematical expression is defined as the collection of the numbers variables and functions by using operations like addition, subtraction, multiplication, and division.

We have to given that';

Expression is,

⇒ x³ = - 81

Now, We can simplify as;

⇒ x³ = - 81

⇒ x³ = - 3³

⇒ x = - 3

Thus, The value of x in the expression is,

⇒ x = - 3

Learn more about the mathematical expression visit:

brainly.com/question/1859113

#SPJ1

Graphing Polynomial Functions
State the degree and leading coefficient of each polynomial in one variable. If it is not a polynomial in one variable,
explain why.
1. a+ 8
3.-5x5 + 3x³-8
5. u³+ 4u²t2 + t4

Answers

The degree and leading coefficient of each polynomial is 5 and -5.

We are given that;

The polynomials a+ 8, -5x5 + 3x³-8, u³+ 4u²t2 + t4

Now,

a + 8

This is a polynomial in one variable, a. The term with the highest exponent of a is a, which has an exponent of 1. The coefficient of a is 1. So the degree is 1 and the leading coefficient is 1.

-5x^5 + 3x^3 - 8

This is a polynomial in one variable, x. The term with the highest exponent of x is -5x^5, which has an exponent of 5. The coefficient of -5x^5 is -5. So the degree is 5 and the leading coefficient is -5.

u^3 + 4u2t2 + t^4

Therefore, by the equation the answer will be 5 and -5.

Learn more about equations;

https://brainly.com/question/17177510

#SPJ1

show that the following functions are of exponential order • f(t) = t3 sin(t) • g(t) = t2et

Answers

Both f(t) and g(t) are of exponential order.

To show that a function f(t) is of exponential order, we need to find positive constants M and k such that:

|f(t)| <= M * e^(k*t) for all t >= t0, where t0 is some arbitrary constant.

Let's start by considering f(t) = t³ * sin(t). We can use the fact that |sin(t)| <= 1 to obtain an upper bound for f(t):

|f(t)| = |t³ * sin(t)| <= t³ for all t

Now we need to find k such that t³ <= M * e^(k*t) for all t >= t0. Taking logarithms of both sides yields:

ln(t³) <= ln(M * e^(kt)) = ln(M) + kt

Simplifying the left-hand side:

3 ln(t) <= ln(M) + k*t

Now we can choose M = 1 and k = 1 to obtain:

3 ln(t) <= ln(1) + t

3 ln(t) <= t

This inequality holds for all t >= 1, so we have shown that f(t) is of exponential order with M = 1 and k = 1.

Next, consider g(t) = t² * e^t. We can once again obtain an upper bound using the fact that e^t >= 1:

|g(t)| = |t² * e^t| <= t² * e^t for all t

To find M and k such that t² * e^t <= M * e^(k*t) for all t >= t0, we can again take logarithms of both sides:

ln(t² * e^t) <= ln(M * e^(kt)) = ln(M) + kt

Simplifying the left-hand side:

2 ln(t) + t <= ln(M) + k*t

Now we can choose M = 1 and k = 2 to obtain:

2 ln(t) + t <= ln(1) + 2t

2 ln(t) + t <= 2t

This inequality holds for all t >= 1, so we have shown that g(t) is of exponential order with M = 1 and k = 2.

Therefore, both f(t) and g(t) are of exponential order.

To know more about exponential order, refer to the link below:

https://brainly.com/question/30123751#

#SPJ11

(a) You are given the point (3,0) in polar coordinates. (i) Find another pair of polar coordinates for this point such that r>0 and 2π≤θ<4π. (ii) Find another pair of polar coordinates for this point such that r<0 and 0≤θ<2π.

Answers

The new pairs of polar coordinates are (3,2π) for r>0 and 2π≤θ<4π, and (-3,π) for r<0 and 0≤θ<2π.



(a) You are given the point (3,0) in polar coordinates.

(i) To find another pair of polar coordinates for this point such that r>0 and 2π≤θ<4π, follow these steps:

1. Start with the given coordinates (3,0).
2. Since we want to keep r>0, r remains 3.
3. To find a new angle θ that is between 2π and 4π, we can add 2π to the current angle (0 + 2π = 2π).
4. The new pair of polar coordinates is (3,2π).

(ii) To find another pair of polar coordinates for this point such that r<0 and 0≤θ<2π, follow these steps:

1. Start with the given coordinates (3,0).
2. To make r<0, we can multiply the current r by -1: (-3).
3. To find a new angle θ that is between 0 and 2π, we can add π to the current angle (0 + π = π).
4. The new pair of polar coordinates is (-3,π).

So, the new pairs of polar coordinates are (3,2π) for r>0 and 2π≤θ<4π, and (-3,π) for r<0 and 0≤θ<2π.

Learn more about polar coordinates:

https://brainly.com/question/11657509

#SPJ11

Other Questions
There are N +1 urns with N balls each. The ith urn contains i 1 red balls and N +1-i white balls. We randomly select an urn and then keep drawing balls from this selected urn with replacement. (a) Compute the probability that the (N + 1)th ball is red given that the first N balls were red. Compute the limit as N +00. (b) What is the probability that the first ball is red? What is the probability that the second ball is red? (Historical note: Pierre Laplace considered this toy model to study the probability that the sun will rise again tomorrow morning. Can you make the connection?) Only cells that express a puromycin-resistance (PR) gene can grow in the presence of the drug puromycin. Ganciclovir is a nontoxic drug that is converted to a lethal toxin in a cell that expresses thymidine kinase (TK). Thy-1 is a fibroblast-specific marker protein. Which of the following selection strategies is the most reasonable one to use in experiments that attempt to generate induced pluripotent stem cells (iPS cells) from fibroblasts (1 point, letter)? Explain your choice (4 points, 2-3 sentences).Engineering fibroblasts to express PR under the control of the Nanog promoter, and selecting iPS cells in puromycin-containing mediaEngineering fibroblasts to express PR under the control of the Thy-1 promoter, and selecting iPS cells in puromycin-containing mediaEngineering fibroblasts to express TK under the control of the Nanog promoter, and selecting iPS cells in ganciclovir-containing mediaEngineering fibroblasts to express TK under the control of the Thy-1 promoter, and selecting iPS cells in ganciclovir-containing mediaEngineering fibroblasts to express TK under the control of the Thy-1 promoter, and selecting iPS cells in puromycin-containing media a rectangular lot is 120ft.long and 75ft,wide.how many feet of fencing are needed to make a diagonal fence for the lot?round to the nearest foot. the norris-la guardia act gave federal courts the power to issue injunctions in nonviolent labor disputes true or false What is the name of a two-axis graph, with a horizontal axis representing time, that displays pulse waveforms? an analog graph a frequency graph a digital graph a timing diagram Calculate the percent yield of the aldol condensation-dehydration reaction.I did the followingPut 0.8 mL aldehyde, 0.2 mL ketone, 4 mL ethanol, 3 mL of 2M sodium hydroxide in a flask. Then swirled it for 15 min. Then I added 6 mL ethanol and 4 mL of 4% acetic acid. I put the solution on ice and crystals formed. I ended up with 0.305 g of product. Please show me how to calcualte my percent yield for my product.ketone= acetone (0.791 g/ mL)aldehyde= 4-Methylbenzaldehyde (1.019 g/ m The prognosis for people with schizophrenia in nonindustrialized countries is _____ than in industrialized countries.a. about equalb. much poorerc. actually betterd. slightly poorer Given that tan()=7/24 and is in Quadrant I, find cos() and csc(). the first correctional institution for children in the u.s., which emphasized industry, education, and strict discipline was called the: the intense love or emotional bonding that leads infants to seek closeness to their parents is called group of answer choices a) intimacy. b) the rooting reflex. c) imprinting. d) attachment. calculate the reactance of, and rms current in, a 260-mh radio coil connected to a 240-v (rms) 10.0-khz ac line. ignore resistance. Calculate the reactance of the coil. Express your answer to three significant figures and include the appropriate units. Calculate rms current in the coil. Express your answer to three significant figures and include the appropriate units. A metal bar pushed along two neutral parallel rails. The distance between the rails is d, and the rails connect with a resistor with a resistance of R. The metal bar moved at a constant speed of v towards the resistor. The system is in the presence of a 4.0 T magnetic field directed out of the page. What is the current through the resistor if the rails and the bar have negligible resistance (6 points)? Assigned values for d = 0.2 m, R = 3.0 , and v = 2 m/s. use the direct comparison test to determine the convergence or divergence of the series. [infinity]n=1 sin^2(n)/n^8sin^2(n)/n^8 >= converges diverges Use the image to determine the type of transformation shown.A. Reflection across the x-axisB. 90 clockwise rotationC. Horizontal translation D. Vertical translation "1. why did businesses consolidate into monopolies, pools, trusts, and interlocking directorates ? (1 pt.)" In many popular fictional movies and books, future projections of the earth (and other fictional planets) show a world devoid of plants, with civilization bustling with activity throughout a worldwide city of skyscrapers hundreds of stories high. Based on your reading about photosynthesis and cellular (aerobic) respiration, is this future world possible? Explain why it is or is not possible in terms of energy flow in the biosphere. Government Spending. Taxes, and Fiscal Policy End of Chapter Problem Which of the following are examples of expansionary fiscal policy, and which are examples of automatic stabilizers? Expansionary Fiscal Policy Automatic Stabilizer 1. The government puid an extra $25 million in unemployment insurance claims last month. b. Now legislation temporarily extends unemployment benefits for an additional 26 weeks c. The IRS collected $50 billion more in taxes last year, even though tax rates were unchanged d. Congress appropriates an additional S125 million in funds to help states pay teachers during a recession Answer Bank T/F. credit life insurance and credit disability insurance are usually recommended for younger workers. Describing a wave what causes a disturbance that results in a wave? identify and explain the domestic and international considerations for todays business environment: