When you round both factors in a multiplication problem up, your estimate will be greater than the actual product.
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.
A positive multiple is one where the result of the multiplication is greater than zero.
They are the same (because multiplication or "of" is commutative).
If 7/15 is the simplest form, equivalent fractions will be greater. To make things greater, use multiplication.
Then 6.8 is greater than 6.08
Your estimate will be greater than the exact number.
Assuming that the estimate is based on sensible approximations, there is no simple way. You will need to compare the estimate and the true value. If you've rounded up, the estimate will be greater. If you've rounded down, the estimate will be less.
greater
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.
One simple way to solve this is to actually do the multiplication. Then you can compare.
Do the multiplication. Select the greater number.
compare with random fraction to a benchmark fraction. to tell if a fraction is less or greater than another fraction.
A positive multiple is one where the result of the multiplication is greater than zero.
You cannot have a common factor with only one number. You must have at least 2 to compare the factors.
A person can get to 214 in multiplication by multiplying 2 by 107. Multiplication is the process by which one number is scaled by another to produce a greater number.
To compare numbers in scientific notation, first check the exponent. Whatever exponent is higher is the greater number. If the exponents are the same, check the first number. Whatever first number is higher is the greater number. 5.7 x 10^3 is greater than 3.89 x 10^3 2.66 x 10^5 is greater than 8.57 x 10^2
Any, and every, multiplication problem must be "less than equal to or greater than one".