The answer depends on what form of radicals: numbers with factors which are square numbers, radicals where the radicand is in the form of a ratio or a decimal number. Without more information it is not possible to give an answer.
Multiply and simplify 3^-2 x3^6
yep hope this answers it question
It is easier to work with simplified radicals just as it is easier to work with simplified fractions. A fundamental rule for math is to simplify whenever possible, as much as possible.
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simplify
To multiply radicals, you can use the property that states the product of two square roots is the square root of the product of the numbers under the radicals. For example, √a × √b = √(a × b). If the radicals are the same, you can also combine them: √a × √a = a. Simplify the resulting radical if possible by factoring out perfect squares.
They are useful in reducing fractions and to simplify radicals. They are useful in reducing fractions and to simplify radicals.
Multiply by the conjugate.
When you multiply 6√2 by √2, you can simplify the expression by multiplying the numbers outside the radicals and multiplying the numbers inside the radicals. This results in 6√2 * √2 = 6 * 2 = 12. Therefore, the answer is 12.
There are three steps on how to evaluate a radical. Some of the step-by-step instructions are multiply two radicals with the same index number by simply multiplying the numbers beneath the radicals, divide a radical by another radical with the same index number by simply dividing the numbers inside, and simplify large radicals using the product and quotient rules of radicals.
Multiply and simplify 3^-2 x3^6
Radicals are considered like radicals if they have the same index and the same radicand (the number or expression under the radical sign). For example, ( \sqrt{3} ) and ( \sqrt{12} ) are not like radicals, but ( \sqrt{5} ) and ( 2\sqrt{5} ) are like radicals because they both involve the same radicand, ( 5 ). You can simplify radicals to check if their radicands match, which helps in identifying like radicals.
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if youre dealing with fractions then you multiply top by top and bottom by bottom then simplify
7 + 3(n-2)
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To multiply fractions, simply multiply the numerators together and the denominators together, then simplify if necessary. For division, invert the second fraction (take its reciprocal) and then multiply as you would with multiplication of fractions. Always remember to simplify the result if possible for a clearer answer.