Uppose f(x,y)=x2+y2−8x−10y+3 (A) How many critical points does f have in R2? (B) If there is a local minimum, what is the value of the discriminant D at that point? If there is none, type N. (C) If there is a local maximum, what is the value of the discriminant D at that point? If there is none, type N. (D) If there is a saddle point, what is the value of the discriminant D at that point? If there is none, type N. (E) What is the maximum value of f on R2? If there is none, type N. (F) What is the minimum value of f on R2? If there is none, type N.

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dmsmith192

06.01.2023

Mathematics

Following are the solution to the given question:

Step-by-step explanation:

Please find the complete question in the attached file.

$\bar{x}=650\\\\\sigma =24\\\\n=36\\\\$

Calculating the sampling distribution of the sample mean:

$\to \mu=\mu_\bar{x}=650$

Calculating the sampling distribution of the standard deviation:

$\to \sigma_\bar{x}=\frac{\sigma}{\sqrt{n}}=\frac{24}{\sqrt{36}}=\frac{24}{6}=4$

Again, suppose you were to draw all possible samples of size 36 from a large population with a mean

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