Find the largest interval on which the given function is incre...

Question

Find the largest interval on which the given function is increasing.

d. R(x) = √ 2x - 1

Accepted Answer

Welcome back, everyone. For the function H X equals square root of 3 x minus 9, what is the largest interval on which H of X is increasing? Let's begin by finding the domain of this function because we have a square root function we have to recall that the term under the radical should be non-negative, so 3 x minus 9 should be greater than or equals to 0. If we solve this inequality, this means that 3 X is greater than or equal to 9, and X is greater than or equal to 3. So we have found the domain. Those are all of the X values for which the function is defined. Now let's recall that the square root function. is basically a function that it keeps increasing in all of its domain, right? So, essentially, if we think about square root of X. With an increase in x square root of X increases, so whenever we increase the input, the output also keeps increasing. In this case, we have found the minimum value for which each of X is defined, meaning for any other value, the function will keep increasing as long as we keep increasing X. And that's it. We have defined the interval for which. The function H of X is increasing. So in this case, that would be X belongs to the interval from 3. Up to infinity. Simply speaking, the largest interval on which H of X is increasing is the whole domain of H of X, and that's how our final answer. Thank you for watching.

Find the largest interval on which the given function is increasing.

d. R(x) = √ 2x - 1

Key Concepts

Derivative

Critical Points

Interval Notation

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