Ratios & Proportions - ACT Math
Card 1 of 30
Simplify the ratio 36 to 48.
Simplify the ratio 36 to 48.
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3:4. Divide both numbers by their GCD of 12.
3:4. Divide both numbers by their GCD of 12.
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State the definition of a proportion.
State the definition of a proportion.
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An equation that shows two ratios are equal. Two ratios set equal form a proportion.
An equation that shows two ratios are equal. Two ratios set equal form a proportion.
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What is the result of simplifying the ratio 18:24?
What is the result of simplifying the ratio 18:24?
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3:4. Divide both terms by their GCD of 6.
3:4. Divide both terms by their GCD of 6.
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What is the simplest form of the ratio $18:24$?
What is the simplest form of the ratio $18:24$?
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$3:4$. Divide both terms by their GCD of 6.
$3:4$. Divide both terms by their GCD of 6.
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What is the proportion if $x:6 = 8:12$?
What is the proportion if $x:6 = 8:12$?
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x = 4. Cross-multiply: $x \times 12 = 6 \times 8$, so $x = 4$.
x = 4. Cross-multiply: $x \times 12 = 6 \times 8$, so $x = 4$.
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What is $x$ if $\frac{x}{12}=\frac{5}{8}$?
What is $x$ if $\frac{x}{12}=\frac{5}{8}$?
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$x=7.5$. Cross multiply: $8x=60$, so $x=7.5$.
$x=7.5$. Cross multiply: $8x=60$, so $x=7.5$.
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What is the ratio of 10 to 50 in simplest form?
What is the ratio of 10 to 50 in simplest form?
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1:5. Divide both numbers by their GCD of 10.
1:5. Divide both numbers by their GCD of 10.
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What is the cross product of $\frac{2}{3} = \frac{4}{x}$?
What is the cross product of $\frac{2}{3} = \frac{4}{x}$?
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2x = 12. Cross multiply: $2 \cdot x = 3 \cdot 4$.
2x = 12. Cross multiply: $2 \cdot x = 3 \cdot 4$.
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Convert the ratio 16:4 to simplest form.
Convert the ratio 16:4 to simplest form.
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4:1. Divide both numbers by their GCD of 4.
4:1. Divide both numbers by their GCD of 4.
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What is the simplest form of the ratio 50:100?
What is the simplest form of the ratio 50:100?
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1:2. Divide both terms by their GCD of 50.
1:2. Divide both terms by their GCD of 50.
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Find the value of $k$ in the proportion $\frac{9}{12} = \frac{k}{16}$.
Find the value of $k$ in the proportion $\frac{9}{12} = \frac{k}{16}$.
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k = 12. Cross-multiply: $9 \times 16 = 12 \times k$, so $k = 12$.
k = 12. Cross-multiply: $9 \times 16 = 12 \times k$, so $k = 12$.
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Solve for $x$ if $\frac{x}{3} = \frac{5}{15}$.
Solve for $x$ if $\frac{x}{3} = \frac{5}{15}$.
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$x = 1$. Cross-multiply: $x \times 15 = 3 \times 5$, so $x = 1$
$x = 1$. Cross-multiply: $x \times 15 = 3 \times 5$, so $x = 1$
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Determine the value of $y$ if $\frac{7}{y} = \frac{14}{28}$.
Determine the value of $y$ if $\frac{7}{y} = \frac{14}{28}$.
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y = 14. Cross-multiply: $7 \times 28 = y \times 14$, so $y = 14$.
y = 14. Cross-multiply: $7 \times 28 = y \times 14$, so $y = 14$.
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Find the missing term in the proportion $\frac{5}{x} = \frac{10}{20}$.
Find the missing term in the proportion $\frac{5}{x} = \frac{10}{20}$.
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x = 10. Cross-multiply: $5 \times 20 = x \times 10$, so $x = 10$.
x = 10. Cross-multiply: $5 \times 20 = x \times 10$, so $x = 10$.
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What is the ratio of 20 to 30 in simplest form?
What is the ratio of 20 to 30 in simplest form?
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2:3. Divide both terms by their GCD of 10.
2:3. Divide both terms by their GCD of 10.
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What is the proportion if 3:4 = x:8?
What is the proportion if 3:4 = x:8?
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x = 6. Cross-multiply: $3 \times 8 = 4 \times x$, so $x = 6$.
x = 6. Cross-multiply: $3 \times 8 = 4 \times x$, so $x = 6$.
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How is the concept of 'rate' related to ratios?
How is the concept of 'rate' related to ratios?
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A rate is a special type of ratio comparing different units. Rates compare quantities with different units of measurement.
A rate is a special type of ratio comparing different units. Rates compare quantities with different units of measurement.
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Determine the value of $y$ in the proportion $\frac{5}{y} = \frac{10}{30}$.
Determine the value of $y$ in the proportion $\frac{5}{y} = \frac{10}{30}$.
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y = 15. Cross-multiply: $5 \times 30 = y \times 10$, so $y = 15$.
y = 15. Cross-multiply: $5 \times 30 = y \times 10$, so $y = 15$.
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Find the value of $x$ if $\frac{4}{x} = \frac{12}{36}$.
Find the value of $x$ if $\frac{4}{x} = \frac{12}{36}$.
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x = 12. Cross-multiply: $4 \times 36 = x \times 12$, so $x = 12$.
x = 12. Cross-multiply: $4 \times 36 = x \times 12$, so $x = 12$.
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What is the definition of an 'equivalent ratio'?
What is the definition of an 'equivalent ratio'?
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Ratios that express the same relationship. Different ratios that represent the same comparison.
Ratios that express the same relationship. Different ratios that represent the same comparison.
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What is the ratio of 4 to 8 in simplest form?
What is the ratio of 4 to 8 in simplest form?
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1:2. Divide both terms by their GCD of 4.
1:2. Divide both terms by their GCD of 4.
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What is the definition of a 'unit rate'?
What is the definition of a 'unit rate'?
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A rate with a denominator of one. The second quantity equals 1 in a unit rate.
A rate with a denominator of one. The second quantity equals 1 in a unit rate.
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Identify the simplest form of the ratio 9:12.
Identify the simplest form of the ratio 9:12.
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3:4. Divide both terms by their GCD of 3.
3:4. Divide both terms by their GCD of 3.
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Find the missing value in $\frac{15}{x} = \frac{45}{75}$.
Find the missing value in $\frac{15}{x} = \frac{45}{75}$.
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x = 25. Cross-multiply: $15 \times 75 = x \times 45$, so $x = 25$.
x = 25. Cross-multiply: $15 \times 75 = x \times 45$, so $x = 25$.
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What is the simplified ratio of 75 to 100?
What is the simplified ratio of 75 to 100?
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3:4. Divide both terms by their GCD of 25.
3:4. Divide both terms by their GCD of 25.
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Determine the simplest form of the ratio 8:20.
Determine the simplest form of the ratio 8:20.
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2:5. Divide both terms by their GCD of 4.
2:5. Divide both terms by their GCD of 4.
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What is the ratio of 10 to 25 in simplest form?
What is the ratio of 10 to 25 in simplest form?
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2:5. Divide both terms by their GCD of 5.
2:5. Divide both terms by their GCD of 5.
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Express the ratio of 14 to 42 in simplest form.
Express the ratio of 14 to 42 in simplest form.
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1:3. Divide both terms by their GCD of 14.
1:3. Divide both terms by their GCD of 14.
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What is the ratio of 0.5 to 2.5 in simplest form?
What is the ratio of 0.5 to 2.5 in simplest form?
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1:5. Convert to whole numbers: $5:25$, then divide by 5.
1:5. Convert to whole numbers: $5:25$, then divide by 5.
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Express the ratio 45:60 in simplest form.
Express the ratio 45:60 in simplest form.
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3:4. Divide both terms by their GCD of 15.
3:4. Divide both terms by their GCD of 15.
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