Is \(\displaystyle{f{{\left({x}\right)}}}={1}-{x}-{\frac{{{e}^{{{x}}}}}{{{x}^{{{2}}}}}}\) concave or convex at

Dakota Livingston

Dakota Livingston

Answered question

2022-04-14

Is f(x)=1xexx2 concave or convex at x=1?

Answer & Explanation

tutaonana223a

tutaonana223a

Beginner2022-04-15Added 15 answers

Step 1
The second derivative is determinative of concavity. Start by finding the first derivative.
f(x)=1ex(x2)ex(2x)(x2)2
f(x)=1x(xex2)x4
f(x)=1xex2x3
Now differentiate this.
fx)=0(ex+xex)x3(xex2)(3x2)(x3)2
fx)=x3ex+x4ex3x3ex+6x2x6
fx)=x4ex2x3ex+6x2x6
Step 2
We now evaluate the point within the second derivative.
f1)=(1)4e12(1)3e1+6(1)2(1)6
f1)=1e21e+61
f1)=1e+2e+61
This is obviously negative, therefore, the function is convex at x=1. If the second derivative had had a positive value at x=1, then we would have dubbed it concave at that point.

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