**Is f(x)=(x-2)/e^x increasing or decreasing at x=-2**

Increasing functions can have part of the graph that are not increasing (this label is correct as long as the graph tends to be "going up"). Strictly increasing means that the entirety of the graph must be "going up" at all times (no flatness or decreasing allowed).... In order to say a function is "increasing" in this sense, the domain must contain at least two points; it makes no sense to say a function is "increasing at a point". (This is close to ordinary English usage: A "trend" requires at least two data points.)

**Is f(x)=(x-2)/e^x increasing or decreasing at x=-2**

In the long run, companies and production processes can exhibit various forms of returns to scale- increasing returns to scale, decreasing returns to scale, or constant returns to scale. Returns to scale are determined by analyzing the firm's long-run production function, which gives output quantity as a function of the amount of capital (K) and the amount of labor (L) that the firm uses, as... A function is called increasing on an interval if the function value increases as the independent value increases. That is if x 1 > x 2 , then f(x 1 ) > f(x 2 ). On the other hand, a function is called decreasing on an interval if the function value decreases as the independent value increases.

**Is f(x)=(x-2)/e^x increasing or decreasing at x=-2**

Increasing functions can have part of the graph that are not increasing (this label is correct as long as the graph tends to be "going up"). Strictly increasing means that the entirety of the graph must be "going up" at all times (no flatness or decreasing allowed). how to end up in higher elo after placements A function is called increasing on an interval if the function value increases as the independent value increases. That is if x 1 > x 2 , then f(x 1 ) > f(x 2 ). On the other hand, a function is called decreasing on an interval if the function value decreases as the independent value increases.

**Is f(x)=(x-2)/e^x increasing or decreasing at x=-2**

In the long run, companies and production processes can exhibit various forms of returns to scale- increasing returns to scale, decreasing returns to scale, or constant returns to scale. Returns to scale are determined by analyzing the firm's long-run production function, which gives output quantity as a function of the amount of capital (K) and the amount of labor (L) that the firm uses, as mass effect 3 how to find grissom As mentioned in the other answers, you look at subsets of the domain where the first derivative of the function is positive or negative to determine where the function is increasing or decreasing.

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### Is f(x)=(x-2)/e^x increasing or decreasing at x=-2

- Is f(x)=(x-2)/e^x increasing or decreasing at x=-2
- Is f(x)=(x-2)/e^x increasing or decreasing at x=-2
- Is f(x)=(x-2)/e^x increasing or decreasing at x=-2
- Is f(x)=(x-2)/e^x increasing or decreasing at x=-2

## How To Find If A Function Is Increasing Or Decreasing

To find the zeros of a function, set the function equal to zero and solve for the independent variable. a. 3x2 + x – 10 = 0 (3x To help you decide whether a function is increasing, decreasing, or constant on an interval, you can evaluate the function for several values of x. However, calculus is needed to determine, for certain, all intervals on which a function is increasing, decreasing

- In the long run, companies and production processes can exhibit various forms of returns to scale- increasing returns to scale, decreasing returns to scale, or constant returns to scale. Returns to scale are determined by analyzing the firm's long-run production function, which gives output quantity as a function of the amount of capital (K) and the amount of labor (L) that the firm uses, as
- As mentioned in the other answers, you look at subsets of the domain where the first derivative of the function is positive or negative to determine where the function is increasing or decreasing.
- A function is called increasing on an interval if the function value increases as the independent value increases. That is if x 1 > x 2 , then f(x 1 ) > f(x 2 ). On the other hand, a function is called decreasing on an interval if the function value decreases as the independent value increases.
- In the long run, companies and production processes can exhibit various forms of returns to scale- increasing returns to scale, decreasing returns to scale, or constant returns to scale. Returns to scale are determined by analyzing the firm's long-run production function, which gives output quantity as a function of the amount of capital (K) and the amount of labor (L) that the firm uses, as