Determining Intervals 2
- Thread starter Michael13
- Start date
Hi Michael:
We don't do homework assignments. But, if you show us your work thus far, we will help you to finish.
What did you get, when you differentiated g(x) ?
Have you studied the First Derivative Test for determining where a function is increasing or decreasing?
Can you explain why you're stuck?
Cheers
Sorry Everyone.
Sorry all, I just wanted to throw them on here real quick. This is what I have so far:
I found g'=(5x(x-14))/((x-7)
This gave me critical points of 0 and 14
I believe that the minimum is 14 and the maximum is 0 because 7 is not in the domain and I am looking at two curves.
I believe that the function is increasing on (infinity, 0)(14, infinity) and decreasing (0,7)(7,14)
tell what you think and thank you so much!
Sorry all, I just wanted to throw them on here real quick. This is what I have so far:
I found g'=(5x(x-14))/((x-7)
This gave me critical points of 0 and 14
I believe that the minimum is 14 and the maximum is 0 because 7 is not in the domain and I am looking at two curves.
I believe that the function is increasing on (infinity, 0)(14, infinity) and decreasing (0,7)(7,14)
tell what you think and thank you so much!
HallsofIvy
Elite Member
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- Jan 27, 2012
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- 7,760
This is wrong but may be a typo- the denominator should be squared.
Yes. The denominator is always positive so the sign of g' depends on the sign of the numerator. For x< 0, the numerator is the product of one positive number (5) and two negative numbers so g' is positive. For 0< x< 14, the numerator is the product of two positive and one negative number and so g' is negative. (Again, because x- 7, in the denominator, is squared, the sign does not change at x= 7). Finally, for x> 14, the numerator is the product of three positive numbers so g' is positive.
(You mean "(-infinity, 0)" not "(infinity, 0)".)