2 Answers

Ask a Question

Nonozor · Answer 1 · 2019-01-02T08:31:43+0000

$\bf \qquad \textit{ inverse proportional variation}\\\\\\ \begin{array}{llllll} \textit{something}&&\textit{varies inversely to}&\textit{something else}\\ \quad \\ \textit{something}&=&\cfrac{{{\textit{some value}}}}{}&\cfrac{}{\textit{something else}}\\ \quad \\ y&=&\cfrac{{{\textit{k}}}}{}&\cfrac{}{x} &&y=\cfrac{{{ k}}}{x} \end{array}$

"The weight of a person on or above the surface of the earth varies inversely as the square of the distance the person is from the center of the earth"

namely "w" varies inversely to
$\bf d^2$ or
$\bf w=\cfrac{k}{d^2}$

then
"A particular person weighs 192 pounds on the surface of the earth and the radius of the earth is 3900 miles. "
namely when w = 192, d = 3900

so
$\bf w=\cfrac{k}{d^2}\qquad \begin{cases} w=192\\ d=3900 \end{cases}\implies 192=\cfrac{k}{3900^2} \\\\\\ \textit{solve for$

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

2 Answers

0 Comments

Please log in or register to add a comment.

0 Comments

Please log in or register to add a comment.

Other Questions