2 Answers

Qbyte · Answer 1 · 2019-06-21T22:59:20+0000

Answer:

$5,300

Explanation:

Formulae used,

$a=\frac{(\sum x^2y\sum xx)-(\sum xy\sum xx^2)}{(\sum xx\sum x^2x^2)-({\sum xx^2)}^2}$

$b=\frac{(\sum xy\sum x^2x^2)-(\sum x^2y\sum xx^2)}{(\sum xx\sum x^2x^2)-({\sum xx^2)}^2}$

$c=(\sum y)/(n)-b(\sum x)/(n)-a(\sum x^2)/(n)$

Where,

$\sum xx=\sum x^2-((\sum x)^2)/(n)$

$\sum xy=\sum xy-(\sum x\sum y)/(n)$

$\sum xx^2=\sum x^3-(\sum x\sum x^2)/(n)$

$\sum x^2y=\sum x^2y-(\sum x^2\sum y)/(n)$

$\sum x^2x^2=\sum x^4-((\sum x^2)^2)/(n)$

Putting the values from the table, we get the best fit line as,

y= -0.0817x^2 + 102.24x - 20421

As we want to calculate the profit at 350 pounds, so putting x=350, we get

$y= -0.0817(350)^2 + 102.24(350) - 20421=\$5354.75$

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