In mathematics, a polynomial is an expression of finite length constructed from variables (also known as indeterminates) and constants, using only the operations of addition, subtraction, multiplication, and non-negative, whole-number exponents.
Rational function:
In mathematics, a rational function is any function which can be written as the ratio of two polynomial functions. It can be written as((x - 2) / (x + 3))
(Source: Wikipedia)
Example Problems for Polynomials Rational Expressions
Polynomials rational expressions example problem 1:
Simplifying the given rational expressions ((5x + 15) / (10x + 40))
Solution:
Given rational expression is ((5x + 15) / (10x + 40))
Take 5 as common in the numerator value, we get
= ((5(x + 3)) / (10x + 40))
Take 10 as common in the denominator value, we get
= ((5(x + 3)) / (10(x + 4)))
Divide the both numerator and denominator value by 5, we get
= ((x + 3) / (2 (x + 4)))
Answer:
The final answer is ((x + 3) / (2(x + 4)))
Polynomials rational expressions example problem 2:
Simplifying the given rational expressions ((4x + 12) / (2x + 84))
Solution:
Given rational expression is ((4x + 12) / (2x + 84))
Take 4 as common in the numerator value, we get
= ((4(x + 3)) / (2x + 84))
Take 2 as common in the denominator value, we get
= ((4(x + 3)) / (2(x + 42)))
Divide the both numerator and denominator value by 2 , we get
= ((2(x + 3)) / (x + 42))
Answer:
The final answer is ((2(x + 3)) / (x + 42))
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Polynomials rational expressions example problem 3:
Simplifying the given rational expressions ((3x + 12) / (12x + 84))
Solution:
Given rational expression is ((3x + 12) / (12x + 84))
Take 3 as common in the numerator value, we get
= ((3(x + 4)) / (12x + 84))
Take 12 as common in the denominator value, we get
= ((3(x + 4)) / (12(x + 7)))
Divide the both numerator and denominator value by 3, we get
= ((x + 4) / (4 (x + 7)))
Answer:
The final answer is ((x + 4) / (4(x + 7)))
Polynomials rational expressions example problem 4:
Simplifying the given rational expressions ((13x + 13) / (13x + 26))
Solution:
Given rational expression is ((13x + 13) / (13x + 26))
Take 13 as common in the numerator value, we get
= ((13(x + 1)) / (13x + 26))
Take 13 as common in the denominator value, we get
= ((13(x + 1)) / (13(x + 2)))
Divide the both numerator and denominator value by 13, we get
= ((x + 1) / (x + 2))
Answer:
The final answer is ((x + 1) / (x + 2))
Practice Problems for Polynomials Rational Expressions
Polynomials rational expressions practice problem 1:
Simplifying the given rational expressions ((5x + 75) / (15x + 45))
Answer:
The final answer is ((x + 15) / (3(x + 3)))
Polynomials rational expressions practice problem 2:
Simplifying the given rational expressions ((3x + 30) / (6x + 54))
Answer:
Given rational expression is ((x + 10) / (2(x + 9)))
Polynomials rational expressions practice problem 3:
Simplifying the given rational expressions ((2x + 30) / (4x + 56))
Answer:
Given rational expression is ((x + 15) / (2(x + 14)))
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