The inverse variation of the function exists y = 5/x.
In Math's, inverse variation exists the connections between variables that exist expressed in the form of y = k/x, where x and y exist as two variables and k exists as the constant value. It notes if the value of one quantity grows, then the value of the other quantity declines.
Inverse variation exists given by
xy = k
where k exists a constant
Divide each side by x, then we get
xy/x = k/x
y = k/x
Substitute the value of k = 5
y = 5/x exists an equation that exists inverse variation.
Therefore, the correct answer is option C. Y = 5/x.
Which of the following equations is an example of inverse variation between
the variables x and y?
A. y=5x
B.y=x+5
C.y=5/x
D. y=x/5
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