Sequences & Series Questions and Answers
Algebra
Sequences & SeriesFind the equation of the quadratic function using the given information. The vertex is (x, y) = (-1, 4) and a point on the graph is (x, y) = (4.8).
Algebra
Sequences & SeriesThis task is relative to the Jo-walking context. Use the variables z and y defined in the text above this question.
a. Write a formula that expresses Jo's distance from her car in feet, y, in terms of her distance from her house in feet, z.
b. When z = 35, what is the value of y?
c. At some moment Jo is 111 feet from her house. What are the values and y at this moment?
d. At some moment Jo is 44 feet from her car. What are the values of a and y at this moment?
Algebra
Sequences & SeriesSolve.
√x-6 +8 = x
Select the correct choice below and, if necessary, fill in the answer box to complete your choice.
A. The solution(s) is/are
B. There is no solution.
Algebra
Sequences & SeriesConsider the function f(x) = 3 (cos(x − 3) + 1). Determine its amplitude, period, and midline. Enter the exact answers. For the number 7, either choose from the bar at the top or type in Pi (with a capital P).
Algebra
Sequences & SeriesFind the amount of time it would take for a $38,000 investment to double given the following scenario. An interest rate of 4.56% compounded continuously. Do not round-off anything until you obtain the final answer. Round your answers to the nearest.
Algebra
Sequences & SeriesThe healing time for a broken clavicle is from a Normal distribution with a mean of 41 days and a standard deviation of 6 days. What's the probability a clavicle will heal...
14) in under 50 days?
15) in over 35 days?
16) in between 32 and 44 days?
Algebra
Sequences & SeriesThe local store makes a display of soup that is in the shape of a triangle. There are 20 cans in the Sarow from the top and 68 cans in the 17a. row from the top.
a) How many cans are in top row?
b) Write a general term for this arithmetic sequence
Algebra
Sequences & SeriesHow many pounds of candy that sells for $0.71 per tb must be mixed with candy that sells for $1.29 per i to obtain 7 b of a misture that should sel for $0.95 per b
$0.71-per-b candy
$1.29-per-candyb
Algebra
Sequences & SeriesT(1,0)=(1,4), T(1,1)=(2,5)
Remember that T: R^2 -> R^2 is a linear transformation
Find:
a. T(a,b)
b. T(3,5)
c. Null(T)
d. Range
e. Is T onto? Why?
f. Is T one-to-one? Why?
Algebra
Sequences & SeriesHow many pounds of candy that sells for $0.71 per lb must be mixed with candy that sells for $1.29 per b to obtain 7 b of a mixture that should sell for $0.95 per b
$0.71-per-b candy b
$1.29-per-b candyb
Algebra
Sequences & SeriesWhat course should the boat follow for its return trip straight back to the marina? Round the answer to one decimal place if necessary.
The boat should follow the course
A fishing boat leaves a marina and follows a course of S68°W at 8 knots for 15 min. Then the boat changes to a new course of $30°W at 3 knots for 1 hr.
Round intermediate steps to four decimal places.
(a) How far is the boat from the marina? Round the answer to one decimal place if necessary.
Algebra
Sequences & SeriesThe volume V of an ideal gas varies directly with the temperature T and inversely with the pressure P. A cylinder contains oxygen at a temperature of 310 degrees K and a pressure of 18 atmospheres in a volume of 120 liters. Find the pressure if the volume is decreased to 105 liters and the temperature is increased to 330 degrees K.
Algebra
Sequences & SeriesArrange the steps in correct order to solve the congruence 2x = 7 (mod 17) using the inverse of 2 modulo 17, which is 9.
Multiplying both sides of the equation by 9, we get x = 9.7 (mod 17).
9 is an inverse of 2 modulo 17. The given equation is 2x = 7 (mod 17).
Since 63 mod 17 = 12, the solutions are all integers congruent to 12 modulo 17, such as 12, 29, and -5.
Algebra
Sequences & SeriesEmploy the regresion function y = a0(1-e¹x) to fit the following data via excel solver. Plot the Solutions.
Algebra
Sequences & SeriesDetermine the amplitude of the function y=- sin x. Graph the function and y = sin x.
The amplitude is
Algebra
Sequences & SeriesOrthogonally diagonalize the matrix, giving an orthogonal matrix P and a diagonal matrix D. To save time, the eigenvalues are - 11 and -2.
Algebra
Sequences & SeriesForm a polynomial f(x) with real coefficients having the given degree and zeros.
Degree 5; zeros: 6; - i; -8+ i
Let a represent the leading coefficient. The polynomial is f(x)
Algebra
Sequences & SeriesDetermine which of the following sets of vectors are linearly independent in R³.
((-4, 1, 3), (-2,-1, 1), (4, 5, 2))
((1, 2, 2), (0, -1, 4), (-3, -6, -6)}
((7.2.-1), (3, 0, 5), (0, 4, 4). (-5, 1, 6))
[(0, 1), (1.0), (0, 0))
Algebra
Sequences & Seriesfind the value of the annuity at the end of the indicated number of years. Assume that the interest is compounded with the same frequency as the deposits (Round your answer to the nearest cent.)
Algebra
Sequences & SeriesThe cost of producing x grapefruits is given by C(x)= 450+ 2.4x. Determine the average cost function
Algebra
Sequences & SeriesThe cost of producing x grapefruits is given by C(x) =450+ 2.4x. Determine the average cost function.
Algebra
Sequences & SeriesFind the cardinal number of each of the following sets. Assume the pattern of elements continues in each part in the order given.
a. (214, 215, 216, 217,..., 1013}
c. (6, 12, 24, 48, 96, ..., 768}
b. (3, 5, 7,..., 101}
d. (xlx = k³, k= 1, 2, 3, 83)
a. The cardinal number of {214, 215, 216, 217,..., 1013) is
b. The cardinal number of (3, 5, 7, 101) is
c. The cardinal number of (6, 12, 24, 48, 96,...,
768) is
d. The cardinal number of (xix=k³, k= 1, 2, 3,..., 83) is
Algebra
Sequences & SeriesLarry purchased a new combine that cost $220.500, minus a rebate of $2,500, a trade-in of $8,500, and a down payment of $9,000. He takes out a loan for the balance at 8% APR over 4 years. Find the annual payment. (Simplify your answer completely. Round your answer to the nearest cent.)
Algebra
Sequences & SeriesChange each of the following equations into general form.
x+2)² + (x−1)² =
2
4
a.
1
b. x-5=2(y + 4)²
Algebra
Sequences & SeriesWrite an equation in standard form of the line passing through the points (3, 5) and (-5, 7).
The equation is
(Type your answer in standard form.)
Algebra
Sequences & SeriesSolve.
1
12
1
2 25y 25 10y
N
▪▪▪
Select the correct choice below and, if necessary, fill in the answer box to complete your choice.
OA. The solution(s) is/are
(Type an integer or a simplified fraction. Use a comma to separate answers as needed.)
O B. The solution set is {y I y is a real number and y
(Type an integer or a simplified fraction. Use a comma to separate answers as needed.)
OC. There is no solution.
Algebra
Sequences & SeriesWhat if the qualified individual cannot self-
administer the aid -in-dying drug ?What
assistance is permitted ,if any?
Algebra
Sequences & SeriesWhen travelling a fixed distance, the speed at
which you travel varies inversely with the time it
takes to reach your destination. If it takes 40
minutes when driving at 50 miles per hour, how
quickly can you make the trip when driving at 65
miles per hour? Round your answer to the
nearest tenth.
Algebra
Sequences & SeriesBuild the least common multiple of A, B, and C using
the example/method in module 8 on page 59&60.
Then write the prime factorization of the least
common multiple of A, B, and C.
A = 37³ 13⁹ 19⁹
B = 26 73116. 13. 23
C = 3.52.7.11.17
Algebra
Sequences & SeriesA point on a line and its slope are given. Find the point-slope form of the equation of the line.
P = (1,4); m = 4
Algebra
Sequences & SeriesLet W be the subspace of R³ spanned by the vectors
- 1988 1
P =
cijen
BALL
-
WIN W
-les seules
Find the projection matrix P that projects vectors in 12³ onto W
Algebra
Sequences & SeriesJon recently drove to visit his parents who live 90 miles away. On his way there his average speed was 24 miles per hour faster than on his way home the ran into some
bad weather). If Jon spent a total of 4 hours driving, find the two rates (in mph). Round your answer to two decimal places, if needed.
Algebra
Sequences & SeriesWrite an equation that expresses the statement.
(Use k as the constant of proportionality.)
Pvaries inversely as T.
Algebra
Sequences & SeriesA blue candle and red candle are lit at the same time but burn at different rates. The blue candle is 7.9 inches long
when lit and burns at a constant rate of 2.9 inches per hour. The red candle is 5.1 inches long when lit and burns at a
constant rate of 1.4 inches per hour.
a. For each candle, write a formula expressing the remaining length of the candle (in inches) in terms of the
number of hours t since the candle was lit.
o Blue Candle:
1 =>
o Red Candle:
One solution: (t, l)
21
ONo solution
Infinite number of solutions
Preview
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syntax error
b. The time-length relationship for the two candles form a system. Find the solution(s) to this system.
syntax error
Preview Invalid notation.
Algebra
Sequences & SeriesCarmen is going to rent a truck for one day. There are two companies she can choose from, and they have the following prices.
Company A charges an initial fee of $55 and an additional 70 cents for every mile driven.
Company B has no initial fee but charges 80 cents for every mile driven.
For what mileages will Company A charge at least as much as Company B?
Use m for the number of miles driven, and solve your inequality for m.
Algebra
Sequences & SeriesA once-popular children's doll is slowly declining in popularity. The quartic function f(x) = 0.002x4 +0.025x³ -0.364x² -7.243x + 86.993, where x is the number of years since 1993, can be used to estimate the number
of dolls of this type that were sold (in thousands) during a given year from 1993 to 2003. Estimate how many dolls were sold in 1995.
Algebra
Sequences & Series4. (Systems of equations) Solve the system of equations. Write your answer as an ordered pair.
3x+2y=8
2x-5y=18
Algebra
Sequences & SeriesFirst find f+g, f-g, fg and Then determine the domain for each function.
g
f(x) = 3x + 5, g(x)=x+1
(f+g)(x) = 4x+6 (Simplify your answer.)
What is the domain off + g?
[0,00)
3
(-∞, - 2) - (- 21.0)
(-00,00)
(f-g)(x) = 2x+4 (Simplify your answer.)
What is the domain of f-g?
(-∞0,00)
O [0,00)
(-2,00)
(-∞, -2)U(-2,00)
(fg)(x) =
Algebra
Sequences & SeriesSolve.
1
3
17 1 1
4
4y
6y
***
Select the correct choice below and, if necessary, fill in the answer box to complete your choice.
A. The solution set is (y I y is a real number and y
(Type an integer or a simplified fraction. Use a comma to separate answers as needed.)
OB. The solution(s) is/are
(Type an integer or a simplified fraction. Use a comma to separate answers as needed.).
OC. There is no solution.
Algebra
Sequences & SeriesFor f(x)=x² + 6 and g(x)=x²-9, find the following functions.
a. (fog)(x); b. (gof)(x); c. (fog)(4); d. (gof)(4)
Algebra
Sequences & SeriesFor f(x) = 2x - 4 and g(x) = 4x²-2, find the following functions.
a. (fog)(x); b. (gof)(x); c. (fog)(2); d. (gof)(2)
Algebra
Sequences & SeriesFind the average rate of change of the function f(x) = 4x from x₁ = 0 to x₂ = 7.
Algebra
Sequences & SeriesFirst find f + g, f- g. fg and — Then determine the domain for each function.
f(x) = 4x² - 15x -54, g(x)=x-6
(f+g)(x) = 4x² - 14x-60 (Simplify your answer.)
What is the domain of f + g?
30
(-00,00)
(-∞, -30) (-370,00)
00,
7
O
[0,00)
(f- g)(x) = (Simplify your answer.)
Algebra
Sequences & SeriesFor f(x)=x² +6 and g(x)=x²-9, find the following functions.
a. (fog)(x); b. (gof)(x); c. (fog)(4); d. (gof)(4)
a. (fog)(x) = x4-18x² +87
(Simplify your answer.)
b. (gof)(x)= x + 12x² +27
(Simplify your answer.)
c. (fog)(4) =
Algebra
Sequences & Series2. For each expression, write an equivalent expression by applying the distributive property.
Part a: (x+2) (x +9)
Part b: (x – 5)²
= "$4
Optional: You can use the rectangular diagram below
to help you find the equivalent expression.
& 9972
Algebra
Sequences & SeriesFor f(x) = x + 3 and g(x) = 5x + 4, find the following functions.
a. (fog)(x); b. (gof)(x); c. (fog)(1); d. (gof)(1)
a. (fog)(x) = 5x +7 (Simplify your answer.)
b. (gof)(x) = 5x + 19 (Simplify your answer.)
c. (fog)(1) = 12
d. (gof)(1) =
Algebra
Sequences & SeriesA child is pulling a wagon with a force of 40 pounds. How much work is done in moving the wagon 60 feet if the handle makes an angle of 35° with the ground? Round to the nearest foot- pound.