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Why do you have to solve quotient of rational algebraic expressions?
what are the example of quotient orf rational algebraic expression.
How is dividing rational expressions like multiplying rational expressions?
To divide by a fraction, you simply multiply by the reciprocal. For example, dividing by 3/5 is the same as multiplying by 5/3.
What are dissimilar fractions or rational expressions?
For example: 1/2+1/4+1/8 are dissimilar fractions but also a rational expression that can be simplified to 7/8
Tell whether each number is rational?
Rational numbers include integers, and any number you can write as a fraction (with integers in the numerator and denominator). Most numbers that include roots (square roots, cubic roots, etc.) are irrational - if you take the square root of any integer except a perfect square, for example, you'll get an irrational number. Expressions involving pi and e are also usuallyirrational.
How can the properties of operations be used to solve problems involving integers and rational numbers?
I think that this has to do with PEMDAS. It can also stahnd for, Please Excuse My Dear Aunt Sally. When answering a question like this it always makes me think of the strategy PEMDAS. It is a strategy that can be used for problems like, for example: 2+(9×10)/21.
