The sum of three numbers is 52. The first number is $8$ $8$ less than the second. the third number is $2$ $2$ times the second. What are the numbers?

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The sum of three numbers is 52. The first number is $8$ $8$ less than the second. the third number is $2$ $2$ times the second. What are the numbers?

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Answer 1 · 2018-06-09T16:03:43

The numbers are: $7, 15 and 30$ $7, 15 and 30$

Explanation:

First write an expression for each of the three numbers,
We know the relationship between them so we can use one variable. Choose $x$ $x$ as the smallest one.

Let the first number be $x$ $x$
The second number is $x + 8$ $x+8$
The third number is $2 (x + 8)$ $2(x+8)$

Their sum is $52$ $52$

$x + x + 8 + 2 (x + 8) = 52$ $x+x+8+2(x+8)=52$

$x + x + 8 + 2 x + 16 = 52$ $x+x+8+2x+16=52$

$4 x + 24 = 52$ $4x +24 = 52$

$4 x = 52 - 24$ $4x = 52-24$

$4 x = 28$ $4x = 28$

$x = 7$ $x=7$

The numbers are: $7, 15 and 30$ $7, 15 and 30$

Check: $7 + 15 + 30 = 52$ $7+15+30 = 52$

Answer 2 · 2018-06-09T16:04:13

$7$ $7$ , $15$ $15$ and $30$ $30$

Explanation:

$(x - 8) + x + 2 x = 52$ $(x - 8) + x + 2x = 52$
$4 x - 8 = 52$ $4x - 8 = 52$
$4 x = 52 + 8$ $4x = 52 + 8$
$4 x = 60$ $4x = 60$
$x = \frac{60}{4}$ $x = 60/4$
$x = 15$ $x = 15$

1st number = $15 - 8 = 7$ $15 - 8 = 7$
2nd number = $15$ $15$
3rd number = $15 \cdot 2 = 30$ $15 * 2 = 30$

Checking!
$30 + 15 + 7 = 52$ $30 + 15 + 7 = 52$

Answer 3 · 2018-06-09T16:07:29

The numbers are $7, 15, and 30$ $7, 15, and 30$

Explanation:

"The sum of three numbers is 52" gives you the following equation:

$x + y + z = 52 [1]$ $x+y+z = 52" [1]"$

"the first number is 8 less than the second" gives you the following equation:

$x = y - 8$ $x = y-8$

or

$y = x + 8 [2]$ $y = x+8" [2]"$

"the third number is 2 times the second" gives you the following equation:

$z = 2 y [3]$ $z = 2y" [3]"$

Substitute equation [3] into equation [1]:

$x + y + 2 y = 52$ $x+y+2y = 52$

Combine like terms:

$x + 3 y = 52 [1.1]$ $x+3y = 52" [1.1]"$

Substitute equation [2] into equation equation [1.1]:

$x + 3 (x + 8) = 52$ $x+3(x+8) = 52$

$4 x + 24 = 52$ $4x+24=52$

$4 x = 28$ $4x = 28$

$x = 7$ $x = 7$

Use equation [2] to find the value of y:

$y = 7 + 8$ $y = 7+8$

$y = 15$ $y = 15$

Use equation [3] to find the value of z:

$z = 2 (15)$ $z = 2(15)$

$z = 30$ $z = 30$

Check:

$7 + 15 + 30 = 52$ $7+15+30=52$

$52 = 52$ $52 = 52$

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The sum of three numbers is 52. The first number is $8$ $8$ less than the second. the third number is $2$ $2$ times the second. What are the numbers?

3 Answers

Explanation:

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The sum of three numbers is 52. The first number is $8$ $8$ less than the second. the third number is $2$ $2$ times the second. What are the numbers?