The function f(x) = –2x^3 + 39x^2 -216x + 6 has one local minimum at x = 4 and one local maximum at x = 9.
To determine if the function f(x) = –2x^3 + 39x^2 -216x + 6 has a local minimum or maximum, we need to find the critical points of the function and then determine the nature of those critical points.
First, we take the derivative of the function to find the critical points:
f(x) = –2x^3 + 39x^2 -216x + 6
f'(x) = –6x^2 + 78x - 216
f'(x) = –6(x^2 - 13x + 36)
f'(x) = –6(x - 4)(x - 9)
Setting f'(x) = 0, we get:
–6(x - 4)(x - 9) = 0
This gives us two critical points at x = 4 and x = 9.
To determine the nature of these critical points, we need to look at the sign of the derivative on either side of each critical point.
When x < 4, we have:
f'(x) = –6(x^2 - 13x + 36) < 0
When 4 < x < 9, we have:
f'(x) = –6(x^2 - 13x + 36) > 0
When x > 9, we have:
f'(x) = –6(x^2 - 13x + 36) < 0
This means that f(x) is decreasing on the interval (–∞, 4), increasing on the interval (4, 9), and decreasing on the interval (9, ∞). Therefore, we have a local minimum at x = 4 and a local maximum at x = 9.
To confirm this, we can evaluate the function at these critical points:
f(4) = –2(4)^3 + 39(4)^2 -216(4) + 6 = –26
f(9) = –2(9)^3 + 39(9)^2 -216(9) + 6 = 603
Therefore, the function f(x) = –2x^3 + 39x^2 -216x + 6 has one local minimum at x = 4 and one local maximum at x = 9.
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Write an expression for the sequence of operations described below.
Three increased by the sum of five and six
Type x if you want to use a multiplication sign. Type / if you want to use a division sign. Do not simplify any part of the expression.
A tile maker makes triangular tiles for a mosaic. Two triangular tiles form a square. what is the area of one of the triangular tiles
Answer: [tex]\frac{x^2}{2}[/tex]
Step-by-step explanation:
If two of the tiles form a square together, then one of them must be half of a square. this means that the square is split diagonally.
If you've ever done trigonometry, you'll know this is a 45-45-90 special right triangle. The side lengths are in the ratio of x, x, and xsqrt(2).
so we know the area of one of these tiles will be [tex]\frac{x^2}{2}[/tex], where x is the side length of the square formed.
Sam lives 8 miles from work and Mike lives 30 miles from work. How much farther is Mike's trip to work than Sam's?
The least-squares regression equation
= 968 -3. 34x can be used to predict the amount of
monthly interest paid on a loan after x months. Suppose
the amount of monthly interest after 30 months was
$865. 93.
What is the residual for the amount of monthly interest
paid on a loan after 30 months?
O-202. 27
0 -1. 87
O 1. 87
O 202. 27
The residual for the amount of monthly interest paid on a loan after 30 months is $0.13.
To find the residual, we need to compare the actual value of monthly interest paid after 30 months with the predicted value based on the regression equation.
The regression equation is:
monthly interest = 968 - 3.34x
To find the predicted value for 30 months, we substitute x = 30 into the equation:
monthly interest = 968 - 3.34(30) = 865.8
So the predicted value for monthly interest after 30 months is $865.8.
The residual is the discrepancy between the actual and expected values:
residual = actual value - predicted value
residual = $865.93 - $865.8 = $0.13
Therefore, the residual for the amount of monthly interest paid on a loan after 30 months is $0.13.
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Find an equation of the plane with the given characteristics.
The plane contains the y-axis and makes an angle of r/4 with the positive x-axis.
The equation of the plane is -x(tan(r/4)) + z(sin(r/4)) = 1.
Let the equation of the plane be Ax + By + Cz = D. Since the plane contains the y-axis, we know that x = 0 when y = 0. Therefore, the equation becomes:
0A + 0B + Cz = D
=> Cz = D
This means that the plane is perpendicular to the y-axis and intersects the z-axis at z = D/C.
Now, we need to find the values of A, B, and C. Since the plane makes an angle of r/4 with the positive x-axis, we can use the direction cosines to find these values. The direction cosines of a vector are the cosines of the angles it makes with the x, y, and z axes.
Let the direction cosines of the vector perpendicular to the plane be (l, m, n). Then, we have:
cos(r/4) = l/√(l^2 + m^2 + n^2)
=> l = cos(r/4) / √2
cos(π/2) = m/√(l^2 + m^2 + n^2)
=> m = 0
cos(π/2) = n/√(l^2 + m^2 + n^2)
=> n = sin(r/4) / √2
Therefore, the vector perpendicular to the plane is:
(l, m, n) = (cos(r/4) / √2, 0, sin(r/4) / √2)
Since the plane contains the y-axis, we know that it is perpendicular to the vector (0, 1, 0). Therefore, the dot product of the two vectors is zero:
0A + B + 0C = 0
=> B = 0
Finally, we can use the fact that the vector (A, B, C) is perpendicular to the vector (cos(r/4) / √2, 0, sin(r/4) / √2) to find A and C:
A(cos(r/4) / √2) + 0 + C(sin(r/4) / √2) = 0
=> A = -C(tan(r/4) / √2)
Therefore, the equation of the plane is:
-C(tan(r/4) / √2)x + 0y + C(sin(r/4) / √2)z = D
Multiplying through by √2/C and setting D = √2, we get:
-x(tan(r/4)) + z(sin(r/4)) = 1
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"verify (1,4) is in point of √xy = x^2y − 2, also find
its tangent line to this point"
The equation of the tangent line to the curve at (1,4) is: y = 8x - 4
To verify whether the point (1,4) is on the curve [tex]\sqrt{xy}= x^2y - 2,[/tex]
We can substitute x=1 and y=4 into the equation and see if it is satisfied:
√(14) = 1^24 - 2
2 = 2
Since the equation is true, (1,4) is on the curve.
To find the tangent line to the curve at the point (1,4),
We need to find the derivative of the equation with respect to x and evaluate it at x=1:
[tex]\sqrt{xy} = x^2y - 2[/tex]
Differentiating with respect to x:
[tex](1/2)(x^{(-1/2))}(y) + (1/2)(y^{(-1/2))}(x) = 2xy[/tex]
Simplifying and evaluating at x=1, y=4:
[tex]2 + (1/2)(4^{(-1/2))(1)} = 8[/tex]
The slope of the tangent line is 8.
Using point-slope form, the equation of the tangent line to the curve at (1,4) is:
y - 4 = 8(x - 1)
y = 8x - 4
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Find a quadratic function that models the
number of cases of flu each year, where y is years since 2012. What is the coefficient of x? Round your answer to the nearest hundredth
The quadratic function that models the number of cases of flu each year, where y is years since 2012 is y = -0.02x^2 + 0.5x + 10. The coefficient of x is 0.5.
Suppose the number of cases of flu each year initially increases rapidly, but then starts to level off and eventually decline. We can model this behavior with a quadratic function of the form:
y = ax^2 + bx + c
where y is the number of cases of flu, and x is the number of years since 2012. Estimate the coefficients a, b, and c.
Assume the number of cases of flu was initially very low in 2012, so the y-intercept c is small value, say 10.
Next, assume that the number of cases of flu initially increased rapidly, but then started to level off around 2018.
y = ax^2 + bx + 10
where a is negative and b is positive.
Suppose the coefficient of the linear term is small, since we expect the trend to level off rather than continue to increase at a constant rate.
So, a possible quadratic function that models the number of cases of flu each year is:
y = -0.02x^2 + 0.5x + 10
The coefficient of x in this function is 0.5, which represents the rate of change of the number of cases of flu each year after 2012.
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 Part C
The rectangular sides of the treasure box will be cut from wooden planks
5
9 feet long and foot wide. How many planks will Mr. Penny need so
9
16
that his 18 students can each construct one treasure box?
Mr. Penny will require a total of 20 square feet of wooden planks for all 18 students to construct their treasure boxes.
To determine the number of planks required, we need to calculate the total amount of wood needed for all 18 students' treasure boxes.
Each treasure box has two identical rectangular sides.
Each side is cut from a wooden plank that is 5/9 feet long and 1 foot wide.
Therefore, the area of each side is [tex](5/9) \times 1 = 5/9[/tex] square feet.
Since there are two identical sides for each treasure box, the total area of wood needed for one treasure box is [tex](5/9) \times 2 = 10/9[/tex] square feet.
To find the total wood needed for 18 students' treasure boxes, we multiply the area per treasure box by the number of treasure boxes:
Total wood needed [tex]= (10/9) \times 18 = 20[/tex] square feet.
So, Mr. Penny will require a total of 20 square feet of wooden planks for all 18 students to construct their treasure boxes.
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Question: What is the number of planks required for Mr. Penny's 18 students to each construct one treasure box if the rectangular sides of the treasure box will be cut from wooden planks that are 5/9 feet long and 1 foot wide?
Help on problem 2 and 3!
(I already did 1. Stepby step please ASAP!)
The missing angles ;
22.6°
53.1°
28.1°
Right triangleA right triangle is a type of triangle that has one of its angles measuring 90 degrees (a right angle). The side opposite to the right angle is called the hypotenuse, and the other two sides are called legs or catheti.
We have that;
[tex]Sin \alpha = 5/13\\ \alpha = Sin-1(5/13)\\ \alpha = 22.6[/tex]
[tex]Tan \alpha = 16/12\\\alpha = Tan-1 (16/12)\\= 53.1[/tex]
[tex]Sin \alpha = 8/17\\\alpha = Sin-1(8/17)\\\alpha = 28.1[/tex]
Right triangles have many practical applications, such as in trigonometry, engineering, and architecture.
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Borrar la selección
Pregunta 2: En una restaurante para 94 personas hay 19 mesas en las se pueden
sentar 4,5 o 6 personas. Si sabemos que en el total de mesas con 4 ó 5 sillas se
pueden acomodar 64 personas, ¿Cuántas mesas tienen 4 sillas?
There are 9 tables with 4 chairs in the restaurant.
Let's establish the variables:
Let x be the number of tables with 4 chairs
Let y be the number of tables with 5 chairs
Let z be the number of tables with 6 chairs
We know that there are a total of 19 tables, therefore:
x + y + z = 19 (equation 1)
We also know that the total number of people that can be accommodated in tables with 4 or 5 chairs is 64, therefore:
4x + 5y = 64 (equation 2)
We want to find the value of x, so we need to eliminate y from the equations above. We can do this by multiplying equation 2 by 4, and then subtracting it from equation 1:
x + y + z - 16x - 20y = 19 - 256
Simplifying:
-15x - 19y = -237
Dividing both sides by -19:
x = 9
Therefore, there are 9 tables with 4 chairs.
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Translated Question: Clear the selection Question 2: In a restaurant for 94 people there are 19 tables that can seat 4.5 or 6 people. If we know that the total number of tables with 4 or 5 chairs can accommodate 64 people, how many tables have 4 chairs?
Sausage is 1/2 inch thick roll is 6 inches long how many pieces can be cut
If you cut a 6-inch long sausage roll that is 1/2 inch thick, you can make 12 pieces.
How many pieces can a 6-inch sausage roll with 1/2 inch thickness be cut into?To understand how to arrive at this answer, we need to use some basic math.
First, we need to determine the volume of the sausage roll. We can do this by multiplying the length, width, and height of the roll. In this case, the length is 6 inches, the width is 1/2 inch, and the height is also 1/2 inch. So:
Volume = Length x Width x Height
Volume = 6 x 1/2 x 1/2
Volume = 1.5 cubic inches
Next, we need to determine the volume of each individual piece. To do this, we divide the total volume of the sausage roll by the number of pieces we want to make. In this case, we want to make two equal pieces, so we divide the total volume by 2:
Volume per piece = Total volume / Number of pieces
Volume per piece = 1.5 / 2
Volume per piece = 0.75 cubic inches
Finally, we can determine the dimensions of each individual piece by using the volume per piece and the thickness of the sausage roll. We can calculate the length of each piece by dividing the volume per piece by the thickness:
Length per piece = Volume per piece / Thickness
Length per piece = 0.75 / 0.5
Length per piece = 1.5 inches
So each piece will be 1.5 inches long. To determine how many pieces we can make, we divide the total length of the sausage roll by the length of each piece:
Number of pieces = Total length / Length per piece
Number of pieces = 6 / 1.5
Number of pieces = 4
However, since we are cutting the sausage roll in half, we can make 2 sets of 4 pieces, for a total of 8 pieces.
Alternatively, if we want to make only one cut, we can make two 3-inch long pieces from each half, for a total of 12 pieces.
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Solve this system and identify the solution.
Select one:
a.
(5,-2)
b.
infinite solutions
c.
no solutions
d.
(2,-5)
The correct statement regarding the solution to the system of equations is given as follows:
b. Infinite solutions.
How to solve the system of equations?The system of equations in the context of this problem is defined as follows:
3y - 6x = 24.8 + 2x = y.Replacing the second equation into the first, the value of x is obtained as follows:
3(8 + 2x) - 6x = 24
24 + 6x - 6x = 24
24 = 24.
24 = 24 is a statement that is always true, hence the system has an infinite number of solutions, and thus option B is the correct option for this problem.
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A polling organization asks a random sample of 1,000 registered voters which of two candidates they plan to vote for in an upcoming election. Candidate A is preferred by 400 respondents, candidate B is preferred by 500 respondents, and 100 respondents are undecided. George uses a large sample confidence interval for two proportions to estimate the difference in population proportions favoring the two candidates. This procedure is not appropriate because
This procedure is not appropriate because (A) the two sample proportions were not computed from independent samples.
Independent samples are those chosen at random such that their observations do not depend on the values of other observations. Many statistical analyses are predicated on the assumption of independent samples. Others are intended to evaluate non-independent samples.
Assume that quality inspectors want to compare two laboratories to see if their blood tests produce identical results. Both labs receive blood samples drawn from the same ten children for analysis.
The test results are not independent because both labs analyzed blood samples from the same ten youngsters. The inspectors would need to perform a paired t-test, which is based on the assumption that samples are dependent, to compare the average blood test results from the two labs.
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Correct question:
A polling organization asks a random sample of 1,000 registered voters which of two candidates they plan to vote for in an upcoming election. Candidate A is preferred by 400 respondents, Candidate B is preferred by 500 respondents, and 100 respondents are undecided. George uses a large sample confidence interval for two proportions to estimate the difference in the population proportions favoring the two candidates. This procedure is not appropriate because
(A) the two sample proportions were not computed from independent samples
(B) the sample size was too small
(C) the third category, undecided, makes the procedure invalid
(D) the sample proportions are different: therefore the variances are probably different as well
(E) George should have taken the difference interval for a single proportion instead 500-400 1,000 and then used a large sample confidence
Polynomial in standard form (6d+6) (2d-2)
Answer:
I think the answer is 8d + 4.
Step-by-step explanation:
Combine the like terms, 6d + 2d = 8d. 6 - 2 = 4.
Connie’s team won 12 out of 16 games this season what percentage of game did her team lose
Connie's team lost 4 out of 16 games this season. To calculate the percentage of games lost, we can divide the number of games lost by the total number of games and then multiply by 100.
In this case, 4 divided by 16 is equal to 0.25, or 25% as a percentage. Therefore, Connie's team lost 25% of their games this season.
We first note that the total number of games played is 16. Connie's team won 12 of these games, so the number of games they lost is 16 - 12 = 4. To calculate the percentage of games lost, we divide the number of games lost by the total number of games and then multiply by 100. This gives:
(4 / 16) * 100 = 25%
Therefore, Connie's team lost 25% of their games this season.
It is important to understand how to calculate percentages in order to solve problems like this. In this case, we used the formula:
percentage = (part / whole) * 100
where the "part" is the number of games lost and the "whole" is the total number of games played. By substituting the appropriate values into this formula, we were able to calculate the percentage of games lost by Connie's team.
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Fareed is making a rectangular garden in his backyard. He wants the length of the garden to be 5 feet longer then the width. which type of function can Fareed write to model the possible areas of his garden?
Answer:
Area = w(l) l = 5 + w
Step-by-step explanation:
Tim wants to buy grass seed to cover his whole lawn, except for the pool. The pool is 5 3 4 m by 3 1 2 m. Find the area the grass seed needs to cover. Solve on paper. Then check your work on Zearn
The area of the grass seed needs to cover is 38.625 m².
What is the area of the rectangle?
A quadrilateral with parallel sides that are equal to one another and four equal vertices is known as a rectangle. It is also known as an equiangular quadrilateral for this reason. Rectangles can also be referred to as parallelograms because their opposite sides are equal and parallel.
Here, we have
Given: Tim wants to buy grass seed to cover his whole lawn, except for the pool. The pool is 5 3/4 m by 3 1/2 m.
We have to find the area the grass seed needs to cover.
Let the area of the grass seed needs to cover be A
Now , the area of the lawn L = ( 11 3/4 ) x 5 m²
The area of the lawn L = 58.75 m²
where the length of the pool l= ( 5 3/4 ) m = 5.75 m
The width of the pool is w = ( 3 1/2 ) m = 3.5 m
Now, Area of Rectangle = Length x Width
On simplifying, we get
Area of the pool P = 5.75 x 3.5 = 20.125m²
Now, the area of the grass seed needs to cover A = L - P
The area of the grass seed needs to cover A = 58.75 m² - 20.125 m²
The area of the grass seed needs to cover A = 38.625 m²
Hence, the area of the grass seed needs to cover is 38.625 m².
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3. now consider equations of the form x-a = vbx+c , where a, b, and c are all positive integers and b > 1.
(a) create an equation of this form that has 7 as a solution and an extraneous solution. give the
extraneous solution.
(b) what must be true about the value of bx+c to ensure that there is a real number solution to the
equation? explain.
(a)The equation x - 7 = 2x - 14 + 1 has 7 as a solution (when v = 2) and an extraneous solution of -8.
(b) To have a real number solution, the value of bx + c should be nonzero.
(a) To create an equation of the form x - a = vb(x) + c with 7 as a solution and an extraneous solution, we can start with the equation:
x - 7 = v * (x - 7) + 1
Simplifying this equation, we have:
x - 7 = vx - 7v + 1
Rearranging the terms, we get:
x - vx = 7v - 6
Now, let's assume v = 2. Substituting this value, the equation becomes:
x - 2x = 14 - 6
Simplifying further, we have:
-x = 8
Multiplying both sides by -1, we get:
x = -8
(b) To ensure that there is a real number solution to the equation x - a = vb(x) + c, it must be true that vb(x) + c does not result in division by zero or any other mathematical operation that would lead to an undefined or imaginary number. This implies that bx + c should not be equal to zero, as dividing by zero is undefined.
Therefore, to have a real number solution, the value of bx + c should be nonzero.
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The number 1 through 8 are written in separate slips of paper, and the slips are placed into a box. Then,4 of these slips are drawn at random. What is the probability that the drawn slips are 1,2,3 and 4 in that order?
Can you explain the steps to take on TI-84 calculator?
1/70 is the probability of having slips numbered 1, 2, 3, and 4 drawn in order from the box.
To calculate the probability of drawing slips numbered 1, 2, 3, and 4 in order from a box containing slips numbered 1 through 8, we need to first find out the total number of possible outcomes when drawing four slips without replacement from the box.
The number of ways to draw 4 slips from a set of 8 slips without replacement is given by the combination formula:
= 8!/4!(8-4)! = 70
This means there are 70 possible outcomes when drawing four slips from the box.
To calculate the probability of drawing slips 1, 2, 3, and 4 in that order, we need to consider that there is only one way to draw the slips in that specific order, out of the 70 possible outcomes.
Therefore, the probability of drawing slips 1, 2, 3, and 4 in order is:
P(1,2,3,4 in order) = number of favorable outcomes/total number of possible outcomes = 1/70
So the probability of drawing slips numbered 1, 2, 3, and 4 in order from the box is 1/70.
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[tex]\sqrt[4]{81} -8(\sqrt[3]{216} )+15(\sqrt[5]{32} )+\sqrt{225}[/tex]
[tex]\sqrt[4]{81} -8( \sqrt[3]{216}) +15( \sqrt[5]{32}) +\sqrt{225}[/tex] when simplified gives 0
What are Indices?Indices are small number that tells us how many times a term has been multiplied by itself. Indices are also the power or exponent which is raised to a number or a variable.
How to determine this
[tex]\sqrt[4]{81} -8( \sqrt[3]{216}) +15( \sqrt[5]{32}) +\sqrt{225}[/tex]
When all of then are perfect square
[tex]\sqrt[4]{81}[/tex]= 3 * 3 *3 *3
[tex]\sqrt[3]{216}[/tex] = 6 * 6 * 6
[tex]\sqrt[2]{32}[/tex] = 2 * 2 * 2 * 2 * 2
[tex]\sqrt{225}[/tex] = 15 * 15
Therefore,
3 - 8(6) + 15(2) + 15
3 - 48 + 30 + 15
By collecting like terms
3 + 30 + 15 - 48
48 - 48
= 0
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Dominick and Ryan both invest $6,500 into savings accounts that earn 6. 8% interest. If Dominicks account earns compound interest and Ryan's earns simple interest, how much more interest will Dominick have earned after 10 years?
Dominick has earned $6,465.55 - $4,420.00 = $2,045.55 more interest than Ryan after 10 years.
How to find the earned interest?To solve this problem, we can use the formulas for compound interest and simple interest.
Compound interest formula:
[tex]A = P(1 + r/n)^(^n^t^)[/tex]
Where:
A = the amount after time t
P = the principal
r = the annual interest rate
n = the number of times the interest is compounded per year
t = time in years
Simple interest formula:
I = Prt
Where:
I = the interest earned
P = the principal
r = the annual interest rate
t = time in years
Using the compound interest formula for Dominick's account:
[tex]A = P(1 + r/n)^(^n^t^)[/tex]
A = 6500(1 + 0.068/365)^(365*10)
A ≈ $12,965.55
Using the simple interest formula for Ryan's account:
I = Prt
I = 65000.06810
I = $4,420.00
Dominick's account has earned: $12,965.55 - $6,500 = $6,465.55 in interest.
Ryan's account has earned: $4,420.00 in interest.
Therefore, Dominick has earned $6,465.55 - $4,420.00 = $2,045.55 more interest than Ryan after 10 years.
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Calculate the range of ages in Alesha's family.
Give your answer in years.
My dad is the oldest person in my family and
he is 3 times older than my brother. My
brother is 1 year older than me and I am the
youngest in my family. I am 11 years old.
Answer:
Her dad is 36 years old and brother is 12
Step-by-step explanation:
Since Alesha's brother is one year older you need to add 11+1 to get her brothers age, which is 12.
To get Alesha's dad's age you need to multiply 12x3, which is 36.
So, Alesha's dad is 36 and her brother is 12
The sequence U is defined by: Un +2 = 2 * Un+1+1* Un for n > 2 with given up and u uo 3 U = 1 List the first four terms uo, 21, U2, U3. Enter your answer as: value of uo, value of u1, value of uz, value of uz Enter answer here
The given values for uo and u3 are uo = 1 and u3 = 21. We can use the recurrence relation Un+2 = 2 * Un+1+1* Un to find the remaining terms:
U1 = U3 - 2U2 - 1*U0
U1 = 21 - 2U2 - 1*1
U1 = 20 - 2U2
U2 = U1 - 2U0 + 1*U0
U2 = 20 - 2U0 + 1*1
U2 = 19 - 2U0
Therefore, the first four terms are: 1, 19, -17, -53
So, the answer is: 1, 19, -17, -53.
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Find The Area Of This Shape.
The expression for the area of the triangle is given as follows:
A = 6x² - 7x - 3.
How to obtain the area of a triangle?The area of a rectangle of base b and height h is given by half the multiplication of dimensions, as follows:
A = 0.5bh.
The dimensions for this problem are given as follows:
Base of b = 4x - 6.Height of h = 3x + 1.Hence the expression for the area of the triangle is given as follows:
A = 0.5(4x - 6)(3x + 1)
A = 0.5(12x² - 14x - 6)
A = 6x² - 7x - 3.
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Write the equation below in standard and factored form y= -(x-1)^2+25
Fran is training for her first marathon, and she wants to know if there is a significant difference between the mean number of miles run each week by group runners and individual runners who are training for marathons. She interviews 32 randomly selected people who train in groups, and finds that they run a mean of 49. 0 miles per week. Assume that the population standard deviation from group runners is known to be 4. 2 miles per week
Our calculated t-value (-2.54) is beyond this critical value, we can reject the null hypothesis and conclude that there is a significant difference between the mean number of miles run per week by group runners and individual runners.
To test if there is a significant difference between the mean number of miles run each week by group runners and individual runners who are training for marathons, we can use a two-sample t-test.
Let's assume that the population standard deviation for the individual runners is also 4.2 miles per week.
We can set up the hypotheses as follows:
Null hypothesis: The mean number of miles run per week by group runners and individual runners is the same.
Alternative hypothesis: The mean number of miles run per week by group runners and individual runners is different.
Mathematically, we can write:
H0: μ1 = μ2
Ha: μ1 ≠ μ2
where μ1 is the population mean for group runners and μ2 is the population mean for individual runners.
We are given the sample mean for the group runners, which is 49.0 miles per week. We do not know the sample mean for the individual runners. Let's assume that we collect a random sample of 32 individual runners and find that their sample mean is 52.0 miles per week.
We can calculate the test statistic as follows:
t = (X1 - X2) / sqrt((s1^2/n1) + (s2^2/n2))
where X1 and X2 are the sample means for group runners and individual runners, s1 and s2 are the population standard deviations for group runners and individual runners, and n1 and n2 are the sample sizes for group runners and individual runners.
Plugging in the values, we get:
t = (49.0 - 52.0) / sqrt((4.2^2/32) + (4.2^2/32))
t = -3.0 / 1.182
t = -2.54
Using a t-distribution table with 62 degrees of freedom (32 + 32 - 2), we can find that the critical value for a two-tailed test with a significance level of 0.05 is approximately ±2.0. Since our calculated t-value (-2.54) is beyond this critical value, we can reject the null hypothesis and conclude that there is a significant difference between the mean number of miles run per week by group runners and individual runners.
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Three friends play a game. jamila has 4. 5
more points than carter. carter has 7. 5 more
points than aisha. jamila has 26 points. write
and solve an equation to find the number of
points aisha has. show your work.
The required answer is x = 14
To solve this problem, we can use algebraic equations. Let's start by representing the number of points that Aisha has with the variable "x".
According to the problem, we know that Carter has 7.5 more points than Aisha, so we can write:
Carter = x + 7.5
An algebraic equation or polynomial equation is an equation in which both sides are polynomials (see also system of polynomial equations). These are further classified by degree: linear equation for degree one. quadratic equation for degree two.
We also know that Jamila has 4.5 more points than Carter, which means:
Jamila = (x + 7.5) + 4.5
a variable (from Latin variabilis, "changeable") is a symbol that represents a mathematical object. A variable may represent a number, a vector, a matrix, a function, the argument of a function, a set, or an element of a set.
Algebraic computations with variables as if they were explicit numbers solve a range of problems in a single computation. For example, the quadratic formula solves any quadratic equation by substituting the numeric values of the coefficients of that equation for the variables that represent them in the quadratic formula. In mathematical logic, a variable is either a symbol representing an unspecified term of the theory (a meta-variable), or a basic object of the theory that is manipulated without referring to its possible intuitive interpretation.
Finally, we know that Jamila has 26 points:
Jamila = 26
Now we can solve for x:
(x + 7.5) + 4.5 = 26
x + 12 = 26
x = 14
Therefore, Aisha has 14 points.
To show the work:
Aisha = x
Carter = x + 7.5
Jamila = (x + 7.5) + 4.5
Jamila = 26
(x + 7.5) + 4.5 = 26
x + 12 = 26
x = 14
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A triangular prism is 36 millimeters long and has a triangular face with a base of 36 millimeters and a height of 24 millimeters. The other two sides of the triangle are each 30 millimeters. What is the surface area of the triangular prism?
The surface area of the triangular prism is
5752 square millimetersHow to find the surface area of the triangular prismThe surface area of the triangular prism is
= area of the two side rectangles + area of the base rectangles + area of the 2 triangles
= 2 * 36 * 30 + 36 * 36 + 2 * 1/2 * 36 * 24
= 2160 + 1296 + 1296
= 5752 square millimeters
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A container ship left port last week carrying some goods that weighed a total of 60,010 tons. Today, it stopped in another port to unload. The weight of the goods on the ship is now 30,005 tons. By what percent has the weight of the goods on the ship decreased?
The weight of the goods on the ship decreased by 50 percent.
To find the percentage decrease in the weight of goods on the ship, we need to calculate the difference between the initial weight and the final weight, divide it by the initial weight, and then multiply by 100 to get the percentage decrease.
The initial weight of the goods on the ship was 60,010 tons and the final weight after unloading was 30,005 tons.
The difference between the initial weight and the final weight is 60,010 - 30,005 = 30,005 tons.
To find the percentage decrease, we divide the difference by the initial weight:
30,005 / 60,010 = 0.5
Multiplying by 100 gives us the percentage:
0.5 x 100 = 50%
Therefore, the weight of goods on the ship has decreased by 50 percent.
In conclusion, the percentage decrease in the weight of goods on the ship is 50 percent. This means that the ship has unloaded half of its initial weight and now carries only half of the weight it carried when it left the port last week. This calculation can be helpful for the shipping company to determine the efficiency of their transportation and to plan for future shipments.
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Now that you learned how to calculate the probabilities of each player winning the "maximum game" in the video, let's look at the probabilities of another game. this is how it works: we roll two dice and calculate the multiplication of the two numbers we rolled. --if it is a multiple of 6, i win --if it is not a multiple of 6, you win. here is an example: if you get 3 and 4, the multiplication is 12. twelve is a multiple of 6, so i win! 1. which player would win if you get 2 and 5 in the dice? me or you? 2. which player would win if you get 4 and 2 in the dice? 3. which player would win if you get 1 and 6 in the dice?
1) If you get 2 and 5, the multiplication is 10, which is not a multiple of 6. so, you would win.
2) If you get 4 and 2, the multiplication is 8, which is not a multiple of 6. so, you would win.
3) If you get 1 and 6, the multiplication is 6, which is a multiple of 6. so, I would win.
1) How to find the probability?The question asks about probability which player would win if the numbers rolled are 2 and 5. To answer this, we calculate the product of 2 and 5, which is 10. Since 10 is not a multiple of 6, the person who did not roll the dice (i.e., "you") would win.
2) How to find the probability?The question asks which player would win if the numbers rolled are 4 and 2. We calculate the product of 4 and 2, which is 8. Since 8 is not a multiple of 6, "you" would win again.
3) How to find the probability?The question asks which player would win if the numbers rolled are 1 and 6. We calculate the product of 1 and 6, which is 6. Since 6 is a multiple of 6, the person who rolled the dice (i.e., "me") would win.The game described in the question involves rolling two dice and calculating the multiplication of the two numbers rolled. The outcome of the game depends on whether the product is a multiple of 6 or not.
The solution also provides a general explanation of how to calculate the probability of rolling a multiple of 6 with two dice. To do this, we count the number of ways to roll each multiple of 6 (there are two ways to roll a 6, one way to roll a 12, and no ways to roll an 18) and divide by the total number of possible outcomes (which is 36, since there are 6 possible outcomes for each die and 6*6=36 possible combinations of two dice). This gives us a probability of 1/12, or approximately 0.0833, for rolling a multiple of 6. We can then calculate the probability of not rolling a multiple of 6 by subtracting this probability from 1, which gives us 11/12, or approximately 0.9167.
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