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A Squaring Negative Fractions

I'm trying to help my daughter figure out how to make a math square.

Square of Fraction is one of the basic mathematic functions used to find the squared value of either positive or negative fraction number expressed by both non-zero numerator and denominator, by multiplying the fraction itself twice. For negative fraction number, the squared value is always positive. For example, the fraction A/B multiplied to A/B is the square of fractions. To start, either square the equation or move the parentheses first. We’ll begin by squaring the top bracket and redistributing the power. Then, move the negative exponents down or up, depending on their positions. A negative exponent on top can be brought to the bottom so it’s a reciprocal, and vice versa. Finish by simplifying.There’s often more than one way to simplify negative exponent expressions. Since exponents are repeated multiplication, and you can multiply numbers in whatever order you’d like, different steps can lead to the same result.

In this tutorial we will talk about rationalizing the denominator and numerator of rational expressions. Recall from Tutorial 3: Sets of Numbers that a rational number is a number that can be written as one integer over another. Recall from Tutorial 3: Sets of Numbers that an irrational number is not one that is hard to reason with but is a number that cannot be written as one integer over another. It is a non-repeating, non-terminating decimal. One example of an irrational number is when you have a root of an expression that is not a perfect root, for example, the square root of 7 or the cube root of 2. So when we rationalize either the denominator or numerator we want to rid it of radicals.If the radical in the numerator is a square root, then you multiply by a square root that will give you a perfect square under the radical when multiplied by the numerator. If the radical in the numerator is a cube root, then you multiply by a cube root that will give you a perfect cube under the radical when multiplied by the numerator and so forth... Are you struggling with the basic arithmetic operations: adding square roots, subtracting square roots, multiplying square roots or dividing square roots? Not any more! In the following text, you will find a detailed explanation about different square root properties, e.g., how to simplify square roots, with many various examples given. With this article, you will learn once and for all how to find square roots! (Source: www.omnicalculator.com)