answersLogoWhite

0

im not 100% completely sure on this answer but im somewhat sure that the answer is "it reduces demands made on the brain"

User Avatar

Wiki User

12y ago

What else can I help you with?

Continue Learning about Math & Arithmetic

How does knowing the zeros of a function help determine where a function is positive?

Knowing the zeros of a function helps determine where the function is positive by identifying the points where the function intersects the x-axis. Between these zeros, the function will either be entirely positive or entirely negative. By evaluating the function's value at points between the zeros, one can determine the sign of the function in those intervals, allowing us to establish where the function is positive. This interval analysis is crucial for understanding the function's behavior across its domain.


If a function is positive at a test number does the function has no zeros?

false!


Which the function's values become very positive or negative numbers?

The positive regions of a function are those intervals where the function is above the x-axis. It is where the y-values are positive (not zero). The negative regions of a function are those intervals where the function is below the x-axis. It is where the y-values are negative (not zero).


Give an example of a relation that is NOT a function and explain why it is not a function?

y² = x --> y = ±√x Because there are *two* square roots for any positive number (positive and negative) this will not be a function.


When is a function would be positive real function?

A function is positive on an interval, say, the interval from x=a to x=b, if algebraically, all the y-coordinate values are positive on this interval; and graphically, the entire curve or line lies above the x-axis.on this interval.