Determine whether the ratios 9/15 and 6/10 form a proportion.
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The given ratios 9/15 and 6/10 are equivalent form is a proportion of 3/5.
What is Ratio?
The ratio is defined as a relationship between two quantities, it is expressed as one divided by the other.
To determine whether the ratios 9/15 and 6/10 form a proportion, we need to check whether the cross-products of these ratios are equal. The cross-product of two ratios is found by multiplying the numerator of the first ratio by the denominator of the second ratio, and vice versa.
In this case, the cross-product of the ratios 9/15 and 6/10 is (9 x 10) / (15 x 6) = 90/90 = 1. Since the cross-products of these ratios are equal, the ratios 9/15 and 6/10 form a proportion.
Alternatively, we can also check whether the two ratios are equivalent. To do this, we can simplify both ratios to their lowest terms.
The simplified form of the ratio 9/15 is 3/5, and the simplified form of the ratio 6/10 is 3/5. Since the simplified form of both ratios is the same, the ratios are equivalent and form a proportion.
Learn more about the Ratio here:
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(2 x 10000000) + (0 x 1000000) + (7 x 100000) + (6 x 10000) + (9 x 1000) + (0 x 100) + (3 x 10) + (3 x 1)
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A
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depending on x, G will be Shown
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