How to divide variables - SSAT Middle Level Quantitative

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Question

Solve for the variable:

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Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

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Question

If and , then $\frac{y}{z}$ is equal to:

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Answer

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

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Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

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Question

If and , then $\frac{y}{x}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

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Question

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

Tap to reveal answer

Answer

To solve this problem you can cancel out like terms in the numerator and denominator. For example,

$$\frac{24}{24}$=1$

$$\frac{a}{a}$=1$

So,

$\frac{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g}{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g\cdot h}$=\frac{1}{h}$

All the other terms cancel each other out because they are equal to one.

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Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{z}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

← Didn't Know|Knew It →

Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{x}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

← Didn't Know|Knew It →

Question

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

Tap to reveal answer

Answer

To solve this problem you can cancel out like terms in the numerator and denominator. For example,

$$\frac{24}{24}$=1$

$$\frac{a}{a}$=1$

So,

$\frac{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g}{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g\cdot h}$=\frac{1}{h}$

All the other terms cancel each other out because they are equal to one.

← Didn't Know|Knew It →

Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{z}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

← Didn't Know|Knew It →

Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{x}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

← Didn't Know|Knew It →

Question

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

Tap to reveal answer

Answer

To solve this problem you can cancel out like terms in the numerator and denominator. For example,

$$\frac{24}{24}$=1$

$$\frac{a}{a}$=1$

So,

$\frac{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g}{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g\cdot h}$=\frac{1}{h}$

All the other terms cancel each other out because they are equal to one.

← Didn't Know|Knew It →

Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{z}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

← Didn't Know|Knew It →

Question

Solve for the variable:

Tap to reveal answer

Answer

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

← Didn't Know|Knew It →

Question

If and , then $\frac{y}{x}$ is equal to:

Tap to reveal answer

Answer

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

← Didn't Know|Knew It →

Question

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

Tap to reveal answer

Answer

To solve this problem you can cancel out like terms in the numerator and denominator. For example,

$$\frac{24}{24}$=1$

$$\frac{a}{a}$=1$

So,

$\frac{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g}{24\cdot a\cdot b\cdot c\cdot d\cdot e\cdot f\cdot g\cdot h}$=\frac{1}{h}$

All the other terms cancel each other out because they are equal to one.

← Didn't Know|Knew It →

Knew It

How to divide variables - SSAT Middle Level Quantitative

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of , the result is , which is equal to 4, which is therefore the correct answer.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of:

Simpify the expression.

To solve this problem you can cancel out like terms in the numerator and denominator. For example, So, All the other terms cancel each other out because they are equal to one.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of , the result is , which is equal to 4, which is therefore the correct answer.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of:

Simpify the expression.

To solve this problem you can cancel out like terms in the numerator and denominator. For example, So, All the other terms cancel each other out because they are equal to one.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of , the result is , which is equal to 4, which is therefore the correct answer.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of:

Simpify the expression.

To solve this problem you can cancel out like terms in the numerator and denominator. For example, So, All the other terms cancel each other out because they are equal to one.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of , the result is , which is equal to 4, which is therefore the correct answer.

Solve for the variable:

In order to answer this question, you must isolate on one side of the equation. (Subtract from both sides.)

If and , then is equal to:

If and , then when plugging the variables into the fractional form of:

Simpify the expression.

To solve this problem you can cancel out like terms in the numerator and denominator. For example, So, All the other terms cancel each other out because they are equal to one.

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

If and , then $\frac{y}{z}$ is equal to:

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

If and , then $\frac{y}{x}$ is equal to:

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

If and , then $\frac{y}{z}$ is equal to:

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

If and , then $\frac{y}{x}$ is equal to:

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

If and , then $\frac{y}{z}$ is equal to:

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

If and , then $\frac{y}{x}$ is equal to:

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{4x}{4}$=\frac{16}{4}$

If and , then $\frac{y}{z}$ is equal to:

If and , then when plugging the variables into the fractional form of $\frac{y}{z}$ , the result is $\frac{12}{3}$ , which is equal to 4, which is therefore the correct answer.

In order to answer this question, you must isolate on one side of the equation.

(Subtract from both sides.)

$\frac{3x}{3}$=\frac{9}{3}$

If and , then $\frac{y}{x}$ is equal to:

If and , then when plugging the variables into the fractional form of:

$$\frac{y}{x}$=\frac{30}$5$

$$\frac{30}{5}$=\frac{6}{1}$=6$

Simpify the expression.

$\frac{24abcdefg}{24abcdefgh}$