PSAT Math: Ratios<\/h3><\/div><\/div><\/div>\nA ratio<\/b> is a comparison of one quantity to another. When writing ratios, you can compare part of a group to another part of that group, or you can compare a part of the group to the whole group. Suppose you have a bowl of apples and oranges. You can write ratios that compare apples to oranges (part to part), apples to total fruit (part to whole), and oranges to total fruit (part to whole).<\/p>\n
You can also combine ratios. If you have two ratios, a<\/i>:b<\/i> and b<\/i>:c<\/i>, you can derive a<\/i>:c<\/i> by finding a common multiple of the b <\/i>terms. Take a look at the following table to see this in action.
\n![\"\"](\"https:\/\/wpapp.kaptest.com\/study\/wp-content\/uploads\/psat-math-ratios-proportions-math.png\")
\nWhat\u2019s a common multiple of the b<\/i> terms? The number 12 is a good choice because it\u2019s the least common multiple of 3 and 4\u00a0which will reduce the need to simplify later. Where do you go from there? Multiply each ratio by the factor (use 3 for a<\/i>:b<\/i> and 4 for b<\/i>:c<\/i>) that will get you to b<\/i> = 12.<\/p>\n
The ratio a<\/i>:c<\/i> equals 9:20. Notice we didn\u2019t merely say a<\/i>:c<\/i> is 3:5; this would be incorrect on Test Day (and likely a wrong-answer trap!).<\/p>\n
PSAT Math: Proportions<\/h3><\/div><\/div><\/div>
\nA proportion<\/b> is simply two ratios set equal to each other. Proportions are an efficient way to solve certain problems, but you must exercise caution when setting them up. Watching the units of each piece of the proportion will help you with this. Sometimes the PSAT will ask you to determine whether certain proportions are equivalent\u2014check this by cross-multiplying. You\u2019ll get results that are much easier to compare.<\/p>\nIf a\/b = c\/d, then: ad=bc, a\/c = b\/d, d\/b = c\/a, b\/a = d\/c, BUT a\/d \u2260 c\/b<\/div>\nEach derived ratio shown except the last one is simply a manipulation of the first, so all except the last are correct. You can verify this via cross-multiplication (ad = bc<\/i><\/span>).<\/p>\nAlternatively, pick numerical values for a<\/i>, b<\/i>, c<\/i>, and d<\/i>; then simplify and confirm the two sides of the equation are equal. For example, take the two equivalent fractions 2\/3 and 6\/9 (a = <\/i>2, b = <\/i>3, c = <\/i>6, <\/i>d = <\/i>9).<\/p>\n
Cross-multiplication gives 2 \u00d7 9 = 3 \u00d7 6,<\/span> which is a true statement. Dividing a<\/i> and b<\/i> by c<\/i> and d<\/i> gives 2\/6 = 3\/9 , also true, and so on. However, attempting to equate (a\/d)(2\/9) and (b\/c)(3\/6) will not work.<\/p>\nLet\u2019s take a look at a test-like question that involves ratios:<\/p>\n\t
A ratio<\/b> is a comparison of one quantity to another. When writing ratios, you can compare part of a group to another part of that group, or you can compare a part of the group to the whole group. Suppose you have a bowl of apples and oranges. You can write ratios that compare apples to oranges (part to part), apples to total fruit (part to whole), and oranges to total fruit (part to whole).<\/p>\n
You can also combine ratios. If you have two ratios, a<\/i>:b<\/i> and b<\/i>:c<\/i>, you can derive a<\/i>:c<\/i> by finding a common multiple of the b <\/i>terms. Take a look at the following table to see this in action.
\n
\nWhat\u2019s a common multiple of the b<\/i> terms? The number 12 is a good choice because it\u2019s the least common multiple of 3 and 4\u00a0which will reduce the need to simplify later. Where do you go from there? Multiply each ratio by the factor (use 3 for a<\/i>:b<\/i> and 4 for b<\/i>:c<\/i>) that will get you to b<\/i> = 12.<\/p>\n
The ratio a<\/i>:c<\/i> equals 9:20. Notice we didn\u2019t merely say a<\/i>:c<\/i> is 3:5; this would be incorrect on Test Day (and likely a wrong-answer trap!).<\/p>\n
PSAT Math: Proportions<\/h3><\/div><\/div><\/div>
\nA proportion<\/b> is simply two ratios set equal to each other. Proportions are an efficient way to solve certain problems, but you must exercise caution when setting them up. Watching the units of each piece of the proportion will help you with this. Sometimes the PSAT will ask you to determine whether certain proportions are equivalent\u2014check this by cross-multiplying. You\u2019ll get results that are much easier to compare.<\/p>\nIf a\/b = c\/d, then: ad=bc, a\/c = b\/d, d\/b = c\/a, b\/a = d\/c, BUT a\/d \u2260 c\/b<\/div>\nEach derived ratio shown except the last one is simply a manipulation of the first, so all except the last are correct. You can verify this via cross-multiplication (ad = bc<\/i><\/span>).<\/p>\nAlternatively, pick numerical values for a<\/i>, b<\/i>, c<\/i>, and d<\/i>; then simplify and confirm the two sides of the equation are equal. For example, take the two equivalent fractions 2\/3 and 6\/9 (a = <\/i>2, b = <\/i>3, c = <\/i>6, <\/i>d = <\/i>9).<\/p>\n
Cross-multiplication gives 2 \u00d7 9 = 3 \u00d7 6,<\/span> which is a true statement. Dividing a<\/i> and b<\/i> by c<\/i> and d<\/i> gives 2\/6 = 3\/9 , also true, and so on. However, attempting to equate (a\/d)(2\/9) and (b\/c)(3\/6) will not work.<\/p>\nLet\u2019s take a look at a test-like question that involves ratios:<\/p>\n\t
\nA proportion<\/b> is simply two ratios set equal to each other. Proportions are an efficient way to solve certain problems, but you must exercise caution when setting them up. Watching the units of each piece of the proportion will help you with this. Sometimes the PSAT will ask you to determine whether certain proportions are equivalent\u2014check this by cross-multiplying. You\u2019ll get results that are much easier to compare.<\/p>\n
Each derived ratio shown except the last one is simply a manipulation of the first, so all except the last are correct. You can verify this via cross-multiplication (ad = bc<\/i><\/span>).<\/p>\n Alternatively, pick numerical values for a<\/i>, b<\/i>, c<\/i>, and d<\/i>; then simplify and confirm the two sides of the equation are equal. For example, take the two equivalent fractions 2\/3 and 6\/9 (a = <\/i>2, b = <\/i>3, c = <\/i>6, <\/i>d = <\/i>9).<\/p>\n Cross-multiplication gives 2 \u00d7 9 = 3 \u00d7 6,<\/span> which is a true statement. Dividing a<\/i> and b<\/i> by c<\/i> and d<\/i> gives 2\/6 = 3\/9 , also true, and so on. However, attempting to equate (a\/d)(2\/9) and (b\/c)(3\/6) will not work.<\/p>\n Let\u2019s take a look at a test-like question that involves ratios:<\/p>\n