Ok I got it. Thank you so much.(a) I would write:
[MATH]f(x)=x^{-\frac{1}{n}}[/MATH]
Thus:
[MATH]f'(x)=-\frac{1}{n}x^{-\frac{1}{n}-1}=-\frac{1}{n}x^{-\frac{n+1}{n}}[/MATH]
And so the tangent line will be:
[MATH]y=f'(1)(x-1)+1=-\frac{1}{n}(x-1)+1=-\frac{1}{n}x+\frac{n+1}{n}[/MATH]
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Ok thank you!You should know that 1 to any power is 1.
Also, do not use the quotient rule whenever the numerator, denominator or both the numerator & denominator are a constant.
I noticed one sign mistake.. but besides that is there anything else wrong?View attachment 19014
This is what I did for question b, but I feel like it’s wrong because the answer is so strange. Could someone please help me with this as well? Thank you!!
Thank you and yes I understand that.When you solve for x there should be no x on the other side.
Else it would be easy to solve for x in any expression. For example: 2x-7 = 4x^2. Then 4x^2-2x + 7 =0. Now add x to goth sides. x = 4x^2 -2x+7 +x. No, it does not work that way.
Another example. Solve for x in 3+x =0. so 3+x+x = x. That is x=3+x+x (I added x to 0 to get x on one side of the equal sign).
All right I will try again. Thank you!You should get a quadratic equation in x and then solve it using the method of your choice.