QUESTION IMAGE
Question
solve the equation. then check your solution.
- $\frac{d}{10}=12$
- $-5=\frac{n}{4}$
- $-15=\frac{x}{-8}$
- $\frac{t}{28}=9$
- $\frac{x}{-6}=13$
- $-12=\frac{a}{-3}$
- $\frac{b}{3}=8.2$
- $\frac{x}{5.3}=0.7$
- $\frac{p}{2.3}=4$
- $\frac{y}{50}=-21$
- $\frac{1}{2}=\frac{d}{4}$
- $\frac{3}{4}=\frac{a}{8}$
Step1: Isolate variable via cross-multiply
For $\frac{d}{10}=12$:
$d = 12 \times 10$
Step2: Calculate the product
$d = 120$
Step3: Verify solution
Substitute $d=120$: $\frac{120}{10}=12$, which is true.
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Step1: Isolate variable via cross-multiply
For $-5=\frac{n}{4}$:
$n = -5 \times 4$
Step2: Calculate the product
$n = -20$
Step3: Verify solution
Substitute $n=-20$: $\frac{-20}{4}=-5$, which is true.
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Step1: Isolate variable via cross-multiply
For $-15=\frac{x}{-8}$:
$x = -15 \times (-8)$
Step2: Calculate the product
$x = 120$
Step3: Verify solution
Substitute $x=120$: $\frac{120}{-8}=-15$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{t}{28}=9$:
$t = 9 \times 28$
Step2: Calculate the product
$t = 252$
Step3: Verify solution
Substitute $t=252$: $\frac{252}{28}=9$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{x}{-6}=13$:
$x = 13 \times (-6)$
Step2: Calculate the product
$x = -78$
Step3: Verify solution
Substitute $x=-78$: $\frac{-78}{-6}=13$, which is true.
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Step1: Isolate variable via cross-multiply
For $-12=\frac{a}{-3}$:
$a = -12 \times (-3)$
Step2: Calculate the product
$a = 36$
Step3: Verify solution
Substitute $a=36$: $\frac{36}{-3}=-12$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{b}{3}=8.2$:
$b = 8.2 \times 3$
Step2: Calculate the product
$b = 24.6$
Step3: Verify solution
Substitute $b=24.6$: $\frac{24.6}{3}=8.2$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{x}{5.3}=0.7$:
$x = 0.7 \times 5.3$
Step2: Calculate the product
$x = 3.71$
Step3: Verify solution
Substitute $x=3.71$: $\frac{3.71}{5.3}=0.7$, which is true.
---
Step1: Isolate variable via cross-multiply
For $\frac{p}{2.3}=4$:
$p = 4 \times 2.3$
Step2: Calculate the product
$p = 9.2$
Step3: Verify solution
Substitute $p=9.2$: $\frac{9.2}{2.3}=4$, which is true.
---
Step1: Isolate variable via cross-multiply
For $\frac{y}{50}=-21$:
$y = -21 \times 50$
Step2: Calculate the product
$y = -1050$
Step3: Verify solution
Substitute $y=-1050$: $\frac{-1050}{50}=-21$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{1}{2}=\frac{d}{4}$:
$d = \frac{1}{2} \times 4$
Step2: Calculate the product
$d = 2$
Step3: Verify solution
Substitute $d=2$: $\frac{2}{4}=\frac{1}{2}$, which is true.
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Step1: Isolate variable via cross-multiply
For $\frac{3}{4}=\frac{a}{8}$:
$a = \frac{3}{4} \times 8$
Step2: Calculate the product
$a = 6$
Step3: Verify solution
Substitute $a=6$: $\frac{6}{8}=\frac{3}{4}$, which is true.
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- $d=120$
- $n=-20$
- $x=120$
- $t=252$
- $x=-78$
- $a=36$
- $b=24.6$
- $x=3.71$
- $p=9.2$
- $y=-1050$
- $d=2$
- $a=6$