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Two positive improper fractions are multiplied the product is sometimesalwaysor never that 1?
When two positive improper fractions are multiplied, the product is never 1. An improper fraction is one where the numerator is greater than or equal to the denominator, so when you multiply two such fractions, the resulting product is always greater than 1. Therefore, the statement is "never."
When you multiply fractions by fractions what do you do to the numerators?
they are also multiplied. When multiplying fractions: (N1/D1) x (N2/D2). The new product is (N1 x N2) / (D1 x D2).
What are three different pairs of fractions that have the same product when multiplied?
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.
What is number being multiplied together to obtain in a product are the?
The numbers being multiplied together to obtain a product are called factors. For example, in the multiplication equation 3 × 4 = 12, the numbers 3 and 4 are the factors, and 12 is the product. Factors can be whole numbers, fractions, or algebraic expressions, depending on the context.
Which is greater 66 multiplied by 6 or 94 multiplied by four?
Well, honey, let me break it down for you. 66 multiplied by 6 equals 396, while 94 multiplied by 4 equals 376. So, in this little math showdown, 66 multiplied by 6 is greater than 94 multiplied by 4. Math doesn't lie, darling.
How is the product of 2proper fractions greater than the fractions being multiplied?
It is not: they are the same. A "product" and "multiple" are synonyms.
Two positive improper fractions are multiplied the product is sometimesalwaysor never that 1?
When two positive improper fractions are multiplied, the product is never 1. An improper fraction is one where the numerator is greater than or equal to the denominator, so when you multiply two such fractions, the resulting product is always greater than 1. Therefore, the statement is "never."
Is the product of two proper fractions greater than the fractions being multipled?
No, it is not.
When you multiply two fractions why is the product greater than 1?
The product is not always greater than 1.
Who do fractions get smaller when you multiply them by another fraction?
It depends on what type of fraction it is. If the fractions are improper fractions, the product will be greater than the two fractions multiplied together. (Ex: 3/2 x 5/4 = 15/6 or 5/2. 5/2 is greater than 3/2.) If the fractions both have 1 as a numerator, the product is smaller. (Ex: 1/3 x 1/6 = 1/18. 1/18 is less than 1/3.) Any other fractions, it would depend on what fractions you're multiplying. Remember, you are multiplying the numerator by the other numerator and the denominator by the other denominator. (Answer Product of numerators/Product of denominators)
When is the product of two fractions greater than its factors?
That only happens if they're both improper fractions, i.e. greater than ' 1 '.
What is the general rule for multiplying fractions?
The product of two fractions is equal to the two numerators multiplied together divided by the two denominators multiplied together. (a/x) * (b/y) = (a * b) / (x * y)
When you multiply fractions by fractions what do you do to the numerators?
they are also multiplied. When multiplying fractions: (N1/D1) x (N2/D2). The new product is (N1 x N2) / (D1 x D2).
Which fraction when multiplied by 25 will result in a product that is greater than25?
26/1000
When one factor in multiplication is greater than one is the product greater or less than the other factor?
The terms (factors) used in multiplication are the multiplicand (the factor being multiplied), the multiplier (the factor that the multiplicand is multiplied by) and the product (the answer, or results of the multiplication). Any time either of the factors is greater than the other by at least one, the product will always be greater than the largest factor.
What are three different pairs of fractions that have the same product when multiplied?
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.
What is number being multiplied together to obtain in a product are the?
The numbers being multiplied together to obtain a product are called factors. For example, in the multiplication equation 3 × 4 = 12, the numbers 3 and 4 are the factors, and 12 is the product. Factors can be whole numbers, fractions, or algebraic expressions, depending on the context.
