assume f is an even function and g is an odd function. assume f and g are defined for all real numbers. use the table to evaluate the given compositions.
| x | 1 | 2 | 3 | 4 |
| --- | --- | --- | --- | --- |
| f(x) | 4 | -1 | 2 | -3 |
| g(x) | -3 | -4 | -1 | -2 |

a. f(g(-1))
b. g(f(-4))
c. f(g(-3))
d. f(g(-2))
e. g(g(-1))
f. f(g(0) - 1)
g. f(g(g(-2)))
h. g(f(f(-4)))
i. g(g(g(-1)))

a. f(g(-1)) = \square

Question

assume f is an even function and g is an odd function. assume f and g are defined for all real numbers. use the table to evaluate the given compositions.
| x | 1 | 2 | 3 | 4 |
| --- | --- | --- | --- | --- |
| f(x) | 4 | -1 | 2 | -3 |
| g(x) | -3 | -4 | -1 | -2 |

a. f(g(-1))
b. g(f(-4))
c. f(g(-3))
d. f(g(-2))
e. g(g(-1))
f. f(g(0) - 1)
g. f(g(g(-2)))
h. g(f(f(-4)))
i. g(g(g(-1)))

a. f(g(-1)) = \square

Accepted Answer

# Explanation:
## Step1: Use odd function property for g(-1)
Since $ g $ is odd, $ g(-x) = -g(x) $. So $ g(-1) = -g(1) $. From the table, $ g(1) = -3 $, so $ g(-1) = -(-3) = 3 $.
## Step2: Evaluate f(g(-1))
Now $ g(-1) = 3 $, so we need $ f(3) $. From the table, $ f(3) = 2 $.
# Answer:
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Question

Explanation:

Step1: Use odd function property for g(-1)

Step2: Evaluate f(g(-1))

Answer: