If f(x) = 9×3 + 7×2 – x + C and f(-2) = 1, what is the value of C?
| C = 43 | ||
| C = -101 | ||
| C = -5 | ||
| C = -45 |
0 points
Question 2
Give the domain and range of the relation.
{(8, 2), (5, -8), (-1, 5), (-1, 7)}
| domain = {5, 8, -1, 1}; range = {-8, 2, 5, 7} | ||
| domain = {5, 8, -1}; range = {-8, 2, 5, 7} | ||
| domain = {-8, 2, 5, 7}; range = {5, 8, -1} | ||
| domain = {5, 8, -1, -11}; range = {-8, 2, 5, 7} |
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Question 3
Find the value for the function.
Find f(-x) when f(x) = 3×2 – 4x + 1.
| 3×2 + 4x + 1 | ||
| -3×2 + 4x + 1 | ||
| -3×2 + 4x – 1 | ||
| 3×2 + 4x – 1 |
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Question 4
Give the domain and range of the relation.
{(11, -3), (-2, -7), (-5, -6), (-5, 6)}
| domain = {-3, -7, -6, 6}; range = {11, -2, -5} | ||
| domain = {11, -2, -5, -15}; range = {-3, -7, -6, 6} | ||
| domain = {11, -2, -5, 5}; range = {-3, -7, -6, 6} | ||
| domain = {11, -2, -5}; range = {-3, -7, -6, 6} |
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Question 5
Find the value for the function.
Find f(x + h) when f(x) = 3×2 – 4x – 3.
| 3×2 + 3xh + 3h2 – 4x – 4h – 3 | ||
| 3×2 + 3h2 – 4x – 4h – 3 | ||
| 3×2 + 3h2 + 2x + 2h – 3 | ||
| 3×2 + 6xh + 3h2 – 4x – 4h – 3 |
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Question 6
Find the value for the function.
Find f(x + h) when f(x) = .
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Question 7
Determine whether the relation is a function.
{(-1, -6), (2, -5), (4, 9), (8, -5), (10, 3)}
| Function | ||
| Not a function |
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Question 8
Find the value for the function.
Find f(2x) when f(x) = .
| 2 | ||
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Question 9
Find the domain of the function.
f(x) = x2 + 8
| {x|x ≠ -8} | ||
| {x|x > -8} | ||
| all real numbers | ||
| {x|x ≥ -8} |
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Question 10
Find the value for the function.
Find f(-9) when f(x) = |x|- 6.
| -3 | ||
| 3 | ||
| 15 | ||
| -15 |
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Question 11
Give the domain and range of the relation.
{(-4, 8), (7, 9), (12, 5), (4, -5)}
| domain = {4, -4, 12, 7}; range = {-5, 8, 5, 9} | ||
| domain = {4, -4, 12, 7}; range = {-5, -5, 8, 5, 9} | ||
| domain = {-5, 8, 5, 9}; range = {4, -4, 12, 7} | ||
| domain = {4, -4, 12, 7}; range = {-5, -8, 8, 5, 9} |
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Question 12
Determine whether the relation is a function.
{(1, -2), (1, -4), (4, -3), (9, -1), (12, 5)}
| Function | ||
| Not a function |
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Question 13
Determine whether the relation is a function.
{(-6, 8), (-6, -5), (2, -8), (6, -8), (9, 6)}
| Not a function | ||
| Function |
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Question 14
Solve the problem.
If a rock falls from a height of 50 meters on Earth, the height H (in meters) after x seconds is approximately
What is the height of the rock when x = 1.9 seconds? Round to the nearest hundredth, if necessary.
| 67.69 m | ||
| 40.69 m | ||
| 32.67 m | ||
| 32.31 m |
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Question 15
Solve the problem.
If f(x) = and f(5) = -15, what is the value of A?
| A = -91 | ||
| A = -29 | ||
| A = 91 | ||
| A = 29 |
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Question 16
Find the domain of the function.
g(x) =
| {x|x > 49} | ||
| {x|x ≠ -7, 7} | ||
| {x|x ≠ 0} | ||
| all real numbers |
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Question 17
Solve the problem.
If a rock falls from a height of 60 meters on Earth, the height H (in meters) after x seconds is approximately
H(x) = 60 – 4.9×2.
When does the rock strike the ground? Round to the nearest hundredth, if necessary.
| 2.5 sec | ||
| 3.5 sec | ||
| 12.24 sec | ||
| 1.58 sec |
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Question 18
Solve the problem.
It has been determined that the number of fish f(t) that can be caught in t minutes in a certain pond using a certain bait is f(t) = 0.28t + 1, for t > 10. Find the approximate number of fish that can be caught if you fish for 38 minutes.
| About 24 fish | ||
| About 42 fish | ||
| About 11 fish | ||
| About 40 fish |
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Question 19
Find the value for the function.
Find f(7) when f(x) = .
| 3 | ||
| 2 |
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Question 20
Find the value for the function.
Find f(-4) when f(x) = x2 – 3x + 1.
| 27 | ||
| 29 | ||
| 3 | ||
| 5 |
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Question 21
Find the domain of the function.
f(x) =
| {x|x > -4} | ||
| {x|x ≠ -4} | ||
| all real numbers | ||
| {x|x ≠ 0} |
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Question 22
Determine whether the relation is a function.
{(-6, 3), (-1, 3), (1, -1), (1, 1)}
| Not a function | ||
| Function |
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Question 23
Solve the problem.
If f(x) = , f(4) = 0, and f(6) is undefined, what are the values of A and B?
| A = 4, B = 6 | ||
| A = -6, B = -4 | ||
| A = -4, B = -6 | ||
| A = 6, B = 4 |
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Question 24
Find the domain of the function.
f(x) = 3x – 5
| all real numbers | ||
| {x|x ≥ 5} | ||
| {x|x ≠ 0} | ||
| {x|x > 0} |
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Question 25
Find the value for the function.
Find f(1) when f(x) = .
| – 1 | ||
| – 9 | ||
| – | ||
| 7 |