## How do you prove a function is odd?

If you end up with the exact opposite of what you started with (that is, if f (–x) = –f (x), so all of the signs are switched), then the function is odd. In all other cases, the function is “neither even nor odd”.

### What are the sufficient conditions for maxima and minima of f/x y at a point a B?

If f(x,y)≤f(a,b) for all (x,y) in the domain of f, then f has a global maximum at (a,b). If f(x,y)≥f(a,b) for all (x,y) in the domain of f, then f has a global minimum at (a,b).

#### What is a relative minimum and maximum?

A relative maximum point is a point where the function changes direction from increasing to decreasing (making that point a “peak” in the graph). Similarly, a relative minimum point is a point where the function changes direction from decreasing to increasing (making that point a “bottom” in the graph).

**What is the number at which F has a relative minimum?**

Relative mins are the lowest points in their little neighborhoods. f has a relative min of -3 at x = -1. f has a relative min of -1 at x = 4.

**What does a minimum of mean?**

It comes from the Latin word minimus, meaning “smallest” or “least.” In general, minimum often refers to the smallest possible amount of something that can satisfy a requirement, as in You need a minimum of 10 years of experience to apply for this position.

## How do you know if a derivative is maximum or minimum?

the graph of its derivative f ‘(x) passes through the x axis (is equal to zero). If the function goes from increasing to decreasing, then that point is a local maximum. If the function goes from decreasing to increasing, then that point is a local minimum.

### What does an even function look like?

The graph of an even function is symmetric with respect to the y−axis or along the vertical line x = 0 x = 0 x=0. Observe that the graph of the function is cut evenly at the y−axis and each half is an exact mirror of the another.

#### What is a local minimum and maximum on a graph?

A local maximum point on a function is a point (x,y) on the graph of the function whose y coordinate is larger than all other y coordinates on the graph at points “close to” (x,y). Similarly, (x,y) is a local minimum point if it has locally the smallest y coordinate.

**What if the second derivative test is 0?**

This means, the second derivative test applies only for x=0. At that point, the second derivative is 0, meaning that the test is inconclusive. So you fall back onto your first derivative. It is positive before, and positive after x=0.

**How do you tell if a graph is even or odd?**

The graph of an even function is symmetric about the y-axis. The graph of an odd function is symmetric about the x-axis. It is possible that the use of these two words originated with the observation that the graph of a polynomial function in which all variables are to an even power is symmetric about the y -axis.

## How do you tell if a graph is a function?

Use the vertical line test to determine whether or not a graph represents a function. If a vertical line is moved across the graph and, at any time, touches the graph at only one point, then the graph is a function. If the vertical line touches the graph at more than one point, then the graph is not a function.

### Can there be two absolute minimums?

It is completely possible for a function to not have a relative maximum and/or a relative minimum. Again, the function doesn’t have any relative maximums. As this example has shown there can only be a single absolute maximum or absolute minimum value, but they can occur at more than one place in the domain.

#### Why is second derivative negative for Maxima?

The second derivative is the rate of change of the derivative, and it is negative for the process described above since the first derivative (slope) is always getting smaller. The second derivative is always negative for a “hump” in the function, corresponding to a maximum.

**How do you find minima?**

When a function’s slope is zero at x, and the second derivative at x is:

- less than 0, it is a local maximum.
- greater than 0, it is a local minimum.
- equal to 0, then the test fails (there may be other ways of finding out though)

**How much of a page is 200 words?**

0.4 pages

## Can you reverse a derivative?

An antiderivative of a function f is a function whose derivative is f. To find an antiderivative for a function f, we can often reverse the process of differentiation. For example, if f = x4, then an antiderivative of f is F = x5, which can be found by reversing the power rule.

### How do you find the maxima and minima of two variables?

For a function of one variable, f(x), we find the local maxima/minima by differenti- ation. Maxima/minima occur when f (x) = 0. x = a is a maximum if f (a) = 0 and f (a) < 0; • x = a is a minimum if f (a) = 0 and f (a) > 0; A point where f (a) = 0 and f (a) = 0 is called a point of inflection.

#### What is Maxima condition?

Maxima and minima are plural forms of maximum and minimum. However, in interference and diffraction maxima refers to the zones where the intensity of the light is maximum and minima when the intensity is minimum. When if minimum of a wave superimposes on maximum of the other, it results in a destructive… read more.

**What is the minimum amount of words for a sentence?**

So here’s the rule: your sentences should usually be about from 20 to 30 words long. If your style is breezy, 15 words would be good. Sentences with 50 or more words should be avoided if possible. Throw in a shorter sentence now and then that refocuses, summarizes, surprises.

**What is the minimum value?**

The minimum value of a function is the lowest point of a vertex. If your quadratic equation has a positive a term, it will also have a minimum value. If you have the equation in the form of y = ax^2 + bx + c, then you can find the minimum value using the equation min = c – b^2/4a.

## How long is a 100 word essay?

about 0.2 pages

### What is the minimum value of f x?

FN Therefore, the function does not have a largest value. However, since x2+1≥1 for all real numbers x and x2+1=1 when x=0, the function has a smallest value, 1, when x=0. We say that 1 is the absolute minimum of f(x)=x2+1 and it occurs at x=0. We say that f(x)=x2+1 does not have an absolute maximum (Figure 4.1.

#### What is an example of minimum?

Minimum means the lowest amount or allowable amount of something. An example of a minimum is 40 miles per hour as the lowest speed allowed on a parkway. A lower limit permitted by law or other authority. A sum of money set by a nightclub or restaurant as the least amount each patron must spend on food and drink.

**What does 2nd derivative tell you?**

The second derivative measures the instantaneous rate of change of the first derivative. The sign of the second derivative tells us whether the slope of the tangent line to f is increasing or decreasing. In other words, the second derivative tells us the rate of change of the rate of change of the original function.