Yes.
Two fractions set equal to each other form a proportion.
When adding or subtracting fractions with different denominators finding the prime product of each denominator helps in finding the lowest common denominator of the given fractions by their lowest common multiple.
When you multiply two fractions that are each less than 1, you are essentially taking a portion of a portion. Since each fraction represents a part of a whole, their product results in an even smaller part. Mathematically, if ( a < 1 ) and ( b < 1 ), then ( a \times b < a ) and ( a \times b < b ), ensuring that the product ( ab < 1 ). Therefore, the product of two fractions less than 1 will always be less than 1.
Yes inasmuch that the denominators of the fractions must be common to each other.
U times them by each other da
perpendicular fractions are gradients and are negative recipricals of each other and that multiply to give -1 for example:2/1 times -1/2 gives -1
They are the negative reciprocal of each other. Fo rexample, if a line has slope = +2, then the line perpendicular to it has slope -1/2
Two fractions set equal to each other form a proportion.
When adding or subtracting fractions with different denominators finding the prime product of each denominator helps in finding the lowest common denominator of the given fractions by their lowest common multiple.
When you multiply two fractions that are each less than 1, you are essentially taking a portion of a portion. Since each fraction represents a part of a whole, their product results in an even smaller part. Mathematically, if ( a < 1 ) and ( b < 1 ), then ( a \times b < a ) and ( a \times b < b ), ensuring that the product ( ab < 1 ). Therefore, the product of two fractions less than 1 will always be less than 1.
Yes inasmuch that the denominators of the fractions must be common to each other.
equivalentThe fractions were equivalent to each other
U times them by each other da
It makes it easier. So both of the fractions are proportional to each other.
Three different pairs of fractions that have the same product are: ( \frac{1}{2} ) and ( \frac{4}{1} ) (product = 2) ( \frac{2}{3} ) and ( \frac{3}{2} ) (product = 1) ( \frac{1}{3} ) and ( \frac{9}{1} ) (product = 3) Each pair yields a distinct product.
multiply the numerator and the denominator by the same number, or divide each side by a common factor.
They are equivalent fractions as for example: 3/4 = 9/12