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Suppose y varies inversely with x, and y = -1 when x = 6. What inverse variation equation relates x and y?

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a. y = 6/x
b. y = -12x
c. y= -6x
d. y= -6/x​

User Muhammad Nauman
by
2.7k points

2 Answers

17 votes
17 votes

Answer:

d.
\displaystyle y = (-6)/(x)

Explanation:

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User David Aguirre
by
3.2k points
13 votes
13 votes

Answer:


\displaystyle \text{d. }y=(-6)/(x)

Explanation:

If two values
x and
y are inversely proportional, their product is always some maintained constant (the product of
x and
y is always maintained). This way, if one goes up, the other must go down by the same extent. By definition, this represents an inversely proportional relationship.

Therefore, we can simply find this constant by multiplying the given values of
x and
y:


xy=k,\\6\cdot (-1)=-6

The constant
-6 must be maintained as the product of
x and
y for all values of
x and
y for them to be inversely proportional. Thus, we have the equation:


xy=-6

Divide both sides by
x to isolate
y:


\boxed{y=(-6)/(x)}

User Geoffrey Wiseman
by
3.4k points