Answer:
9. (a, b, intercept, end-behavior) = (3, 3, 3, (≈ 0, +∞))
10. (5, 0.6, 5, (∞, ≈ 0))
Step-by-step explanation:
We assume you're trying to match the given expressions to the form ...
... f(x) = a·b^x
Then the number outside parentheses will be "a", the multiplier of the exponential term. This value is also the y-intercept value.
The value you show inside parentheses is the base of the exponential, "b".
When "b" is greater than 1, the exponential function is increasing, so tends toward ∞ as x goes more positive. The function will tend toward zero (≈ 0) as x goes more negative. In the answer above shows the (end behavior for large negative x, end behavior for large positive x).
Whe "b" is less than 1, the exponential function is the mirror image across the y-axis of the function when b is greater than 1. Hence it tends to large positive values (∞) for x going negative, and tends to zero for x going positive.
