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40 votes
40 votes
The variables y and x have a proportional relationship, and y = 5 when x = 4.

What is the value of x when y = 8?

User Reed Morse
by
3.3k points

2 Answers

23 votes
23 votes

Answer:


\boxed{a = 6.4}

Explanation:

Given:


x:y = (4):(5)

Let the value of "x" be known as "a".


x:y = a:8

Setting up the proportion:


\rightarrow 4:5 = a :8

Multiplying the middles and the extremes:


\rightarrow 5a = 4 * 8

Simplifying the RHS:


\rightarrow a = (4 * 8)/(5)


\rightarrow \boxed{a = 6.4}

Thus, the value of x is 6.4 when y is 8.

User Montezuma
by
2.6k points
14 votes
14 votes

Answer:


\sf x=(32)/(5)

(or x = 6.4 if you want it in decimal form)

Explanation:

If y and x have a proportional relationship, then:

  • y = kx (for some constant k)

Given:

  • x = 4
  • y = 5

Substitute the given values into the equation to find k:

⇒ 5 = k(4)

⇒ k = 5/4

Therefore,
\sf y=\frac54x

When y = 8, substitute y = 8 into the equation and solve for x:


\sf \implies \frac54x=8


\sf \implies x=8 \cdot \frac45


\sf \implies x=(32)/(5)

User Struggles
by
2.9k points
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