The range of flight time is 22 minutes, and the sample standard deviation is 8.24 minutes.
To compute the range, we simply subtract the smallest value from the largest value: Range = 282 - 260 = 22.
To compute the sample standard deviation, we first calculate the mean flight time by summing the values and dividing by the sample size:
Mean = (282 + 270 + 260 + 266 + 260 + 267) / 6 = 266.17
Then we subtract the mean from each flight time, square the differences, sum the squared differences, divide by the sample size minus one, and take the square root of the result:
Standard Deviation = √((1/5) * [(282-266.17)² + (270-266.17)² +
(260-266.17)² + (266-266.17)² + (260-266.17)² + (267-266.17)²]) = 8.24.
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Complete Question:
The following data represent the flight time (in minutes) of a random sample of six flights from Las Vegas, Nevada, to Newark, New Jersey, on United Airlines. 282, 270, 260, 266, 260, 267 Compute the range and sample standard deviation of flight time. The range of flight time is minutes.
The ill fated ship Titanic weighed 46,000 US tons. How many kilograms did it weigh? not metric tons
In Problems 9 and 10 determine whether the given first-order differential equation is linear in the indicated dependent variable by matching it with the first differential equation given in (7).
9. (y^2 - 1)dx + x dy = 0; in y; in x
10. u dv + (v + uv - ue^u) du = 0; in v; in u
8. M(x,y) and N(x,y) are functions of x and y, not just y, so the given differential equation is not linear in y.
9. Both M(u,v) and N(u,v) are functions of u, so the given differential equation is linear in u.
8. To match the given differential equation with the first differential equation given in (7), we need to write the given equation in the form of M(x,y)dx + N(x,y)dy = 0. If the resulting M(x,y) and N(x,y) are both functions of y, then the differential equation is linear in y.
Rewriting (y² - 1)dx + xdy = 0 as xdy = (1 - y²)dx and dividing by x(1 - y²), we get (1/x)dy - [(y² - 1)/(x(1 - y²))]dx = 0.
Therefore, we have M(x,y) = (y² - 1)/(x(1 - y²)) and N(x,y) = 1/x. Both M(x,y) and N(x,y) are functions of x and y, not just y, so the given differential equation is not linear in y.
9. To match the given differential equation with the first differential equation given in (7), we need to write the given equation in the form of M(u,v)du + N(u,v)dv = 0. If the resulting M(u,v) and N(u,v) are both functions of u, then the differential equation is linear in u.
We can rewrite the given equation as u dv + (v + uv) du - [tex]ue^u[/tex] du = 0.
Therefore, we have M(u,v) = v + uv - [tex]ue^u[/tex] and N(u,v) = u. Both M(u,v) and N(u,v) are functions of u, so the given differential equation is linear in u.
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A grocery store bought milk for $2.90 per half gallon and stored it in two refrigerators. During the night, one refrigerator malfunctioned and ruined 14 half gallons. If the remaining milk is sold for $3.94 per half gallon, how many half gallons did the store buy if they made a profit of $46.76 ?
If the remaining milk is sold for $3.94 per half gallon, then the store initially bought 26 half gallons of milk for the profit of $46.76
What is meant by profit?
Profit is the term used to describe the financial gain experienced when the revenue from a company activity outpaces the costs, costs, and taxes incurred to support the activity in question.
Profit is the amount of money you have after paying for business expenses. Gross profit, operating profit, and net profit are the three basic categories of profit.
If the store bought x half gallons of milk at $2.90 per half gallon, the total cost of the milk would be:
total cost = 2.90x
Since the store stored the milk in two refrigerators, there were initially x/2 half gallons in each refrigerator.
Unfortunately, 14 half gallons were ruined, so the number of half gallons of milk remaining for sale is:
x - 14
The store then sells the remaining milk for $3.94 per half gallon, so the total revenue from the sale is:
total revenue = 3.94(x - 14)
The profit the store made is the difference between the total revenue and the total cost:
profit = total revenue - total cost
We know that the store made a profit of $46.76, so we can set up an equation:
46.76 = 3.94(x - 14) - 2.90x
Simplifying and solving for x:
46.76 = 3.94x - 55.16
102.92 = 3.94x
x = 26
So the store initially bought 26 half gallons of milk.
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Amount of butter
What was the difference between the highest guess and the lowest guess?
Write your answer as a fraction, mixed number, or whole number.
The difference between the highest and the lowest guess, on the whole number, is 120.
What is subtraction?Subtraction is a mathematical operation. Which is used to remove terms or objects in the expression.
Given:
A table that shows the amount of butter.
Amount of butter
120
130
150
240
From the table;
the highest guess is 240.
And the lowest guess is 120.
So, the difference between the highest and the lowest guess is,
= 240 - 120
= 120.
And here, 120 is a whole number.
Therefore, the required value is 120.
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If 50l of liquid has a mass of 100kg, what is the density of the liquid in g/cm3? Note:1l = 1000cm3
The density of the liquid is 2g/cm³
What is density?The density of a substance is the relationship between the mass of the substance and how much space it takes up (volume). The mass of atoms, their size, and how they are arranged determine the density of a substance. Density equals the mass of the substance divided by its volume; D = m/v.
Where D is the density
m is the mass and
v is the volume
mass = 100kg = 100000 g( 1kg = 1000g)
50l = 50 × 1000 = 50000cm³
density = 100000/50000
= 2g/cm³
therefore the density of the liquid is 2 g/cm³
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A man walks at 50km per hour.What distance would he cover in 2 and a half hours. pls due 40mins pls hurry 50points!
Answer:
Step-by-step explanation:
He can walk 125km in 2 and a half hours
Answer:
125km
Step-by-step explanation:
If he walks 50km per hour and he walks 2 hours it's 2 x 50km = 100km
if walks for another half hour the half of 50km is 25km so 100km + 25km = 125km
Which one of the following statements is correct when the homoskedasticity assumption is violated while the rest of the OLS assumptions are correct.?
a.The beta parameter estimates can be calculated but they are wrong.
b.The beta parameter estimates are biased
c.The beta parameter estimates are unbiased because homoskedasticity assumption is not required for unbiasedness.
d.The beta parameter estimates cannot be calculated
The correct answer is option b. When the homoskedasticity assumption is violated, The beta parameter estimates are biased while the rest of the OLS assumptions are correct.
When the homoskedasticity assumption is violated, the ordinary least squares (OLS) estimator is still consistent but no longer efficient. This means that the estimates of the regression coefficients (beta parameters) are still unbiased, but they have higher variances and covariances.
In other words, the OLS estimator is no longer the best linear unbiased estimator (BLUE) and it may be biased when the errors are heteroscedastic. Therefore, option b is correct.
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let r be a region in quadrant i with centroid (3,5) and area 12 unit square. find the volume of the solid formed when this region is rotated around the y-axis.
The volume of the solid formed when this region is rotated around the y-axis is V = ∫[1,9] π(8 - y/2)² dy cubic units
Volume is a measure of the amount of three-dimensional space that a solid object occupies.
To find the volume of the solid formed when the region is rotated around the y-axis, we need to use the disk method. This involves slicing the solid into thin disks perpendicular to the y-axis and adding up the volumes of all the disks.
Each disk will have a thickness of dy and a radius of x, which can be expressed in terms of y. We can find the radius of each disk by considering the distance between the y-axis and the edge of the region. Since the region is in quadrant i, we know that the edge of the region is at x = 0 (the y-axis) and x = 6 (the right boundary of the region). Therefore, the radius of each disk is given by x = 6 - (y - 5)/2, or equivalently, x = 8 - y/2.
The area of each disk is given by the formula for the area of a circle, A = πr². Substituting our expression for x into this formula, we get
=> A = π(8 - y/2)².
To find the volume of the solid, we need to integrate the area of each disk over the range of y values that covers the region. Since the region has centroid (3,5) and area 12 square units, we know that the region must extend from y = 1 to y = 9. Therefore, the volume of the solid is given by the integral:
V = ∫[1,9] π(8 - y/2)² dy cubic units
Evaluating this integral will give us the volume of the solid formed by rotating the region around the y-axis.
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Suppose the ratio of Lev's age to Mina's age is 1 : 2 and the ratio of Mina's age to Naomi's age is 3 : 4.
If the sum of all three ages is between 30 and 50, then how old is Mina?
Based on the given age ratio, Mina is 10 years old.
From the case, we know that the age ratio between these 3 people are:
L : M = 1 : 2
M : N = 3 : 4
L = 2M
N = 4/3 M
30 < L + M + N < 50
We can try to find Mina's age range as:
30 < 2M + M + 4/3 M < 50
30 < 13/3 M < 50
120 < 13M < 150
9 < M < 11
Please note that we round down the age range of Mina.
We take M = 10; then:
L = 2M = 2(10) = 20
N = 4/3 M = 4/3 (10) = 13
L + M + N = 20 + 10 + 13
L + M + N = 43 --> PROVEN!
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Inga is solving 2x2 + 12x – 3 = 0. Which steps could she use to solve the quadratic equation? Select three options. 2(x2 + 6x + 9) = 3 + 18 2(x2 + 6x) = –3 2(x2 + 6x) = 3 x + 3 = Plus or minus StartRoot StartFraction 21 Over 2 EndFraction EndRoot 2(x2 + 6x + 9) = –3 + 9
The steps that she could use to solve the quadratic equation is determined as 2(x² + 6x + 9) = 18 + 3.
What is Equation?Equations are mathematical statements with two algebraic expressions flanking the equals (=) sign on either side.
It demonstrates the equality of the relationship between the expressions printed on the left and right sides. LHS = RHS is a common mathematical formula.
Coefficients, variables, operators, constants, terms, expressions, and the equal to sign are some of the components of an equation. The "=" sign and terms on both sides must always be present when writing an equation.
Given:
2x² + 12x - 3 = 0
2x² + 12x = 3
divide through by 2
x² + 6x = ³/₂
Take half of coefficient of x, square it and add it both sides of the equation
(x + 3)² = ³/₂ + 3²
x² + 6x + 9 = 9 + ³/₂
2(x² + 6x + 9) = 18 + 3
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which of the following is the warmest temperature?
5oF above zero, 6oF below zero, 10oF below zero 2oF above zero
Answer: 50 above zero
Step-by-step explanation:
the midterm and final exam grades for a statistics course are provided in the data set below. jaymes, a student in the class, scored 86 on both exams. treat the given data sets as samples. based on the z-scores calculated above, which of jaymes's grades is more unusual, the midterm grade or the final exam grade? select the correct answer below: A. the absolute value of the z-score for the final exam grade is greater than for the midterm grade, so the final exam grade is more unusual. B. the absolute value of the z-score for the midterm exam grade is less than for the final grade, so the midterm grade is more unusual. C. the absolute value of the z-score for the midterm exam grade is greater than for the final grade, so the midterm grade is more unusual. D. the absolute value of the z-score for the final exam grade is less than for the midterm grade, so the final exam grade is more unusual.
The answer is (C) the absolute value of the z-score for the midterm exam grade is greater than for the final grade, so the midterm grade is more unusual.
To calculate the z-scores for the midterm and final exam grades, we first need to calculate the mean and standard deviation for each data set.
For the midterm exam grades:
mean = (80 + 78 + 85 + 82 + 79 + 79 + 78 + 86 + 80 + 84) / 10 = 81.1
standard deviation = sqrt([ (80-81.1)^2 + (78-81.1)^2 + ... + (84-81.1)^2 ] / 9) = 2.336
For the final exam grades:
mean = (81 + 88 + 68 + 69 + 69 + 81 + 82 + 86 + 76 + 71) / 10 = 77.1
standard deviation = sqrt([ (81-77.1)^2 + (88-77.1)^2 + ... + (71-77.1)^2 ] / 9) = 7.042
Now, we can calculate the z-scores for Jaymes's grade of 86 on each exam:
z-score for midterm grade = (86 - 81.1) / 2.336 = 2.094
z-score for final exam grade = (86 - 77.1) / 7.042 = 1.259
To determine which grade is more unusual, we need to compare the absolute values of the z-scores. Since the absolute value of the z-score for the midterm grade is greater than for the final exam grade (|2.094| > |1.259|), we can conclude that the midterm grade is more unusual for Jaymes. Therefore, the answer is (C).
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_____The given question is incomplete, the complete question is given below:
The midterm and final exam grades for a statistics course are provided in the data set below. Jaymes, a student in the class, scored 86 on both exams. Treat the given data sets as samples. Jaymes's wants to know which grade is more unusual, the midterm grade or the final exam grade. Use Use a TI-83, TI-83 Plus, or TI-84 calculator to calculate the z-scores corresponding to each grade. Round your answer to three decimal places.
Midterm 80, 78, 85, 82, 79, 79, 78, 86, 80, 84,
final 81, 88, 68, 69, 69, 81, 82, 86, 76, 71
Can someone help me with these questions
The minimum wage increased by approximately 13.43% from 1987 to 1988.
The minimum wage increased by approximately 3.88% from 2004 to 2005.
How to find the percentage increasea) Assuming minimum wage increased from $3.35 per hour in 1987 to $3.80 per hour in 1988.
To calculate the percent increase, we can use the formula:
percent increase = (new value - old value) / old value * 100%
percent increase = (3.80 - 3.35) / 3.35 * 100% = 13.43%
b) Assuming minimum wage increased from $5.15 per hour in 2004 to $5.35 per hour in 2005.
percent increase = (5.35 - 5.15) / 5.15 * 100% = 3.88%
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The average cost of college for one year is $26,489 with a standard deviation of $3204. If 36 colleges are selected at random, find the following probabilities. Record your answers as a percentage, rounded to the nearest hundredth.
1. Probability the sample mean cost for the 36 schools is less than $25,000
2. Probability that the sample mean cost for the 36 schools is more than $26,000
3. Probability that the sample mean cost for the 36 schools is between $25,575 and $26,500
the probability that the sample mean cost for the 36 schools is between $25,575 and $26,500 is 54.14%.
What is percentage?Percentage is a way of expressing a number as a fraction of 100. The symbol for percentage is "%". For example, if you have 75%, it means 75 out of 100 or 0.75 as a decimal.
Given by the question.
We can solve these problems by using the central limit theorem and the formula for the standard error of the mean.
The standard error of the mean is:
SE = σ/√n
where σ is the population standard deviation, n is the sample size, and √ is the square root.
Using the given values, we have:
SE = 3204/√36 = 534
To find the probability that the sample mean cost for the 36 schools is less than $25,000, we need to calculate the z-score and then use a z-table to find the probability.
z = (25000 - 26489) / 534 = -2.79
Using a standard normal distribution table or calculator, we find that the probability of a z-score less than -2.79 is 0.0026 or 0.26%.
Therefore, the probability that the sample mean cost for the 36 schools is less than $25,000 is 0.26%.
To find the probability that the sample mean cost for the 36 schools is more than $26,000, we need to calculate the z-score and then use a z-table to find the probability.
z = (26000 - 26489) / 534 = -0.91
Using a standard normal distribution table or calculator, we find that the probability of a z-score more than -0.91 is 0.8186 or 81.86%.
Therefore, the probability that the sample mean cost for the 36 schools is more than $26,000 is 81.86%.
To find the probability that the sample mean cost for the 36 schools is between $25,575 and $26,500, we need to calculate the z-scores for both values and then use a z-table to find the probabilities.
z1 = (25575 - 26489) / 534 = -1.73
z2 = (26500 - 26489) / 534 = 0.21
Using a standard normal distribution table or calculator, we find that the probability of a z-score less than -1.73 is 0.0418 and the probability of a z-score less than 0.21 is 0.5832.
Therefore, the probability that the sample mean cost for the 36 schools is between $25,575 and $26,500 is the difference between these probabilities:
0.5832 - 0.0418 = 0.5414
Multiplying by 100, we get a probability of 54.14%.
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Unit 1 Introduction
6 Dahlia's teacher asked her to decompose
the number 6,107. How can Dahlia write
this number in expanded form?
Answers:
Find the volume of the solid obtained by rotating the region bounded by the given curves about the specified line. Sketch the region, the solid, and a typical disk or washer.
y=6−x^2, y=2; about the x-axis
The solid is a cylinder with a typical disk or washer. It is obtained by rotating the region bounded by[tex]y = 6 - x^2[/tex]and y = 2 about the x-axis. The volume is 48π.
The region to be rotated is bounded by the equations [tex]y = 6 - x^2[/tex] and y = 2. The region is bounded horizontally by x = 0 and x = 2 and vertically by y = 2 and [tex]y = 6 - x^2.[/tex] To find the volume of the solid we can use the formula V = ∫2π0∫2y0rdrdθ. The integral inside is the area of a disk with radius r and the integral outside is the circumference of a circle with radius r. We substitute [tex]y = 6 - x^2[/tex] into the integral, giving us [tex]V = ∫2π0∫2(6 - x^2)0rdrdθ[/tex]. By solving the integral we get V = 48π.
y = 2
x² = 6×4 = 24
V = ∫2π0∫2y0rdrdθ
V = 48π
The solid is a cylinder with a typical disk or washer and is obtained by rotating the region bounded by [tex]y = 6 - x^2[/tex] and y = 2 about the x-axis.
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generally, the more someone exercises the less they will weigh (while also maintaining a proper diet). john has started exercising and eating healthy and has recorded his weight each week. using a regression model, how much would you expect john to weigh at the end of week 8 if he continues with his new routine? (round your answer to the nearest tenth.)
We would expect John to weigh approximately 199.8 pounds at the end of week 8 if he continues to burn 6100 calories per week and maintains a proper diet.
Finding the best linear relationship between the independent and dependent variables is the aim of linear regression. To put it another way, it seeks out the line (or plane, or hyperplane in higher dimensions) that best fits the data. The dependent variable's future values for new values of the independent variable can then be predicted using this line.
We may build a linear regression model using the provided data, with activity (in calories) serving as the independent variable and weight (in pounds) serving as the dependent variable. Using this model, we can then forecast John's weight at the conclusion of week eight depending on the number of calories he burned in that week.
Using a spreadsheet or statistical software, we can calculate the regression equation:
Weight = -0.0049 x Exercise + 229.85
We can plug in the exercise value for week 8 (6100 calories) and solve for weight:
Weight = -0.0049 x 6100 + 229.85
Weight ≈ 199.8 pounds
Therefore, we would expect John to weigh approximately 199.8 pounds at the end of week 8 if he continues to burn 6100 calories per week and maintains a proper diet.
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convert the percent to a decimal: according to the local weather report, the probability of rain in boston on february 9 is 78%
Convert the percent to a decimal: according to the local weather report, the probability of rain in Boston on February 9 is 78% is 0.78%.
What is probability?Probability is the measure of how likely an event is to occur. It is expressed as a number between 0 and 1, where 0 indicates impossibility and 1 indicates certainty. Probability theory is used to study random phenomena, such as the outcome of a coin toss or the results of an election. It is also used to make predictions about the future, such as whether it will rain tomorrow.
The probability of choosing a student selected for the AP math class is 13/40 (6 girls and 7 boys selected for the AP math class). Therefore, the probability of choosing a boy or a student selected for the AP math class is 32/40 (19 boys plus 13 students selected for the AP math class out of 40 students).
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The complete question is: According to the local weather report, the probability of rain in Boston on February 9 is 78%. What is 78% converted to a decimal?
Read the following statement: x + y = y + x. The statement demonstrates:
The given statement follows the commutative property.
What is an equation?In mathematics, an equation is a formula that expresses the equality of two expressions, by connecting them with the equals sign =.
The given equation is x+y=y+x
The commutative property states that the change in the order of two numbers in an addition or multiplication operation does not change the sum or the product.
Therefore, the given statement follows the commutative property.
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I need to find the length of JU, Triangle JTU is similar to JLK.
The measure of the side JU of the triangle will be 24 units.
Geometry is one of the oldest branches of mathematics, along with arithmetic. It is concerned with spatial properties such as figure distance, shape, size, and relative position.
Given that the two triangles ΔLKJ and ΔTUJ are similar. The sides LK 96 and the side JK = 64. The side JU = -4 + 4x and JT = 27.
From the similarity property, the length of the segment JU will be calculated as:-
LK / TU = JK / JU
96 / 36 = 64 / ( -4 + 4x )
96( -4 + 4x ) = 36 x 64
-384 + 384x = 2304
384x = 2688
x = 7
The value of JU will be,
JU = -4 + 4x
JU = -4 + 4 x 7
JU = -4 + 28
Ju = 24
Therefore, the length of JU will be 24 units.
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a graphing calculator is recommended. find the taylor polynomial t3(x) for the function f centered at the number a. f(x)
Third-degree Taylor polynomial for f(x) = e centered at a = 1 using a graphing calculator estimate the value of eˣ near x = 1.
A polynomial is an expression consisting of variables and coefficients, which involves only the operations of addition, subtraction, multiplication, and non-negative integer exponents.
Now, let's focus on the Taylor polynomial. The Taylor polynomial of degree n for a function f(x) centered at a is given by the formula:
[tex]Tn(x) = f(a) + f'(a)(x - a) + f''(a)(x - a)^{2/2!} + f'''(a)(x - a)^{3/3!} + ... + f^{n}(a)(x - a)^{n/n!}[/tex]
In this formula, f'(a), f''(a), f'''(a), and f^(n)(a) are the first, second, third, and nth derivatives of f(x), respectively, evaluated at a. The symbol n! denotes the factorial of n, which is the product of all positive integers from 1 to n.
In our case, we're given the function f(x) = e and a = 1. The first derivative of e^x is e^x, the second derivative is e^x, and the third derivative is also eˣ. Evaluating these derivatives at a = 1, we get:
f(1) = e¹ = e
f'(1) = e¹ = e
f''(1) = e¹ = e
f'''(1) = e¹ = e
Substituting these values into the formula for the Taylor polynomial, we get:
[tex]T3(x) = e + e(x - 1) + e(x - 1)^{2/2!} + e(x - 1)^{3/3!}[/tex]
Simplifying this expression, we get:
[tex]T3(x) = e + e(x - 1) + e(x - 1)^{2/2} + e(x - 1)^{3/6}[/tex]
This is the third-degree Taylor polynomial for f(x) = e centered at a = 1. It can be used to approximate the value of eˣ near x = 1.
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Complete Question:
A graphing calculator is recommended. Find the Taylor polynomial T3(x) for the function f centered at the number a. f(x) = e, a = 1.
let s(t) be the position of a particle in meters after t seconds. give the best approximate for the instantaneous velocity at 8 seconds. use this to approximate the position of the particle aftter 10 seconds.
The instantaneous velocity of the particle at 8 seconds is approximately the change in position over the change in time, or[tex]s(8+Δt) - s(8) / Δt[/tex]. If we use Δt = 0.1, then the instantaneous velocity is approximately s(8.1) - s(8) / 0.1. The approximate position of the particle after 10 seconds is then s(8) + (10-8) * (s(8.1) - s(8) / 0.1).
The instantaneous velocity of a particle is defined as the change in position over the change in time. This can be represented by the equation [tex]s(t+Δt) - s(t) / Δt[/tex]. Here, s(t) is the position of the particle at time t, and t is a small change in time. To approximate the instantaneous velocity at 8 seconds, we can use Δt = 0.1. This gives us an equation of s(8+0.1) - s(8) / 0.1. This equation gives us the velocity at 8 seconds. To approximate the position of the particle after 10 seconds, we can use the equation s(8) + (10-8) * (s(8.1) - s(8) / 0.1). This equation gives us an approximate position of the particle after 10 seconds, using the change in position over the change in time. This equation gives us a good approximation of the position of the particle after 10 seconds, given the information about the particle's position at 8 seconds.
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Solve the system of linear equations using substitution. Use a pencil and paper. Which expression would be easier to substitute into the other equation, in order to solve this problem? Explain your reasoning.
x=4y-9
x+4y=3
Answer:
(- 3, 1.5)
--------------------------
Given system:
x = 4y - 9x + 4y = 3The first expression is ready to be substituted as no further operation is required to simplify it.
4y - 9 + 4y = 38y - 9 = 38y = 12y = 12/8y = 1.5Find x:
x = 4*1.5 - 9x = 6 - 9x = - 3please help its due tommorw the options are negative, postive or same
Opposite numbers 5 and -5 are opposite because they are an equal distance from zero.
Absolute value, like |-5| = 5, means that the number is at five units of distance from zero.
How to obtain the opposite of a number?The opposite of a number is obtained exchanging just the signal of the number.
The opposite of a number x is then given as follows:
-x.
As the number and it's opposite is the same distance from zero, they have the same absolute value.
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Divide 36x5 − 44x4 − 28x3 by 4x2.
Answer:-
36*5= 180
44*4= 176
28*3= 84
4*2=8
180-176-84= (-80)
-80/8=(-10)
Step-by-step explanation: Hope this helps. Mark me brainliest :)))
Ethan is 1.85 meters tall. At 10 a.m., he measures the length of a tree's shadow to be 28.45 meters. He stands 24.3 meters away from the tree, so that the tip of his shadow meets the tip of the tree's shadow. Find the height of the tree to the nearest hundredth of a meter.
The height of the tree to the nearest hundredth of a meter will be 6.40 meters.
What is trigonometry?Trigonometry is the branch of mathematics which set up a relationship between the sides and angles of right-angle triangles.
Let h be the height of the tree in meters. Then, based on the similar triangles formed by Ethan, his shadow, the tree, and its shadow, we have:
h / x = Ethan's height/distance to Ethan's feet from the tree
and
h / (x + 28.45) = Ethan's height/distance to Ethan's feet from the tip of the shadows
where x is the length of Ethan's shadow in meters. We can solve for x using the first equation as follows:
x = (Ethan's height/distance to Ethan's feet from the tree) * h
Substituting the given values, we get:
x = (1.85 / 24.3) x h = 0.076 x h
We can now substitute this value of x into the second equation and solve for h:
h / (0.076 x h + 28.45) = 1.85 / 24.3
Multiplying both sides by 0.076h + 28.45, we get:
h = (1.85 / 24.3) x (0.076h + 28.45)
Expanding the right side and simplifying, we get:
h = 0.070 x h + 5.95
Subtracting 0.070h from both sides, we get:
0.930h = 5.95
Dividing both sides by 0.930, we get:
h = 6.40 meters (rounded to the nearest hundredth)
Therefore, the height of the tree is approximately 6.40 meters.
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The Browns are moving across the country. Mr. Brown leaves 5 hours before Mrs. Brown. If he averages 50mph and she averages 90mph , how many hours will it take Mrs. Brown to catch up to Mr. Brown?
It takes Mrs. Brown 6 hours and 15 minutes to catch up to Mr. Brown.
What does average speed refer to?
The entire distance travelled by the object in a specific amount of time is its average speed.
What is a mile?
A common unit of measurement is the mile. It is typically used to describe the length of rivers, highways, and distances between cities. The unit mile is represented by the letter "mi."
Mr. Brown departs at 50 mph five hours early, giving him a 250mile head start.
So:
50n+250=90n
40n=250
n=6.25 hours after Mrs. Brown leaves before she overtakes Mr. Brown.
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Which description best explains the domain of (g circle f) (x)?
the elements in the domain of f(x) for which g(f(x)) is defined
the elements in the domain of f(x) for which g(f(x)) is not zero
the elements in the domain of g(x) for which g(f(x)) is defined
the elements in the domain of g(x) for which g(f(x)) is not zero
The correct description that best explains the domain of (g o f) (x) is: The elements in the domain of f(x) for which g(f(x)) is defined.
How to determine the domain of the fucntionFrom the question, we have the following parameters that can be used in our computation:
(g o f) (x)
The expression (g o f)(x) is a composite function
The domain of (g o f)(x) is the set of all possible inputs x for which the composition (g o f)(x) is defined.
For the composition (g o f)(x) to be defined, it is necessary that the input x belongs to the domain of f(x), and the output of f(x) belongs to the domain of g(x).
Hence, the domain of (g o f)(x) consists of all the elements in the domain of f(x) for which g(f(x)) is defined
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The average height of male basketball players is 79 inches with a standard deviation of 3.25 inches. We want to mass produce special caskets for the NBA that are long enough for all but the tallest 2% of male basketball players.
What is the inside length of the longer NBA caskets in inches (to 2 decimals)?
The inside length of the longer NBA caskets in inches is, 85.6745
What is standard deviation ?A statistical measure of the degree of variation or dispersion in a set of values is the standard deviation. It offers a way to measure how far apart the individual values in a data set are from the set's mean (average). The square root of the variance is used to calculate the standard deviation, which is denoted by the symbol (sigma).
We are given the distribution here as:
From standard normal tables, we have here:
P(Z < 2.0537) = 0.98
Therefore, P(Z > 2.0537) = 1 - 0.98 = 0.02
Therefore 2.0537 is the z score that would be used here. ( As we are given here that for tallest 2% of the male basketball players, the special caskets for the NBA would be too tall )
Therefore the longest length here is computed as:
= Mean + 2.0537xSD
= 79 + 2.0537x3.25
= 85.6745 inches is the required length here.
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For a project in her Geometry class, Madeline uses a mirror on the ground to measure the height of her school building. She walks a distance of 9.45 meters from the building, then places a mirror flat on the ground, marked with an X at the center. She then walks 2.75 more meters past the mirror, so that when she turns around and looks down at the mirror, she can see the top of the school clearly marked in the X. Her partner measures the distance from her eyes to the ground to be 1.55 meters. How tall is the school? Round your answer to the nearest hundredth of a meter.
Madeline's school building model is 5.33 meter.
What are similar triangles?Two triangles are similar if the angles are the same size or the corresponding sides are in the same ratio. Either of these conditions will prove two triangles are similar.
Given that, Madeline walks a distance of 9.45 meters from the building, then places a mirror flat on the ground, marked with an X at the center.
Use corresponding parts of similar triangles.
Madeline's eyes height/Madeline's distance from x = Buildings height/Buildings distance from X
1.55/2.75 = x/9.45
2.75x=1.55×9.45
2.75x=14.6475
x=14.6475/2.75
x=5.33
Therefore, Madeline's school building model is 5.33 meter.
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