Polynomial fraction is in the form of ratio of two polynomials like where divisible of zero is not allowed, like . Various operations can be performed same as we do in simple arithmetic such as add, divide, multiply and subtract.Polynomial fraction is an expression of a polynomial divided by another polynomial. Let P(x) and Q(x), where Q(x) cannot be zero. = The principle which we apply while adding two fraction i.e. where , the same principle is being applied while adding two polynomial fractions containing variables,coeficient in it.Example: Add + Solution: By applying the principle of adding two fraction we get, + = Addition of two expressions with common denominatorsStep 1. Add both of the numeratorStep 2. Take sum of both the numerators in the step 1 and place it over the common denominator.Step 3. Simplify the fraction further by factorizing if possible.Example 1: Add + Solution: Given expression + = = Example 2: Add + Solution: Given expression + = = Factoring the expression = = x+1We can add polynomial fractions with only common denominator but if we don’t have the common denominator, we have to find the least common denominator i.e. LCD which will give us the smallest expression that is divisible by both the denominators. It is also known as least common multiple.Steps to find LCD Least common denominatorsFind the LCM Least common multiple of both the expressions.Change each of the polynomial fractions to make their denominators equal to the LCD.Add both the expressions.Example: Find the LCD + Solution: There are two denominators and 8x. So by placing each factor with its highest power we get the LCD .Addition of two expressions with different denominatorsStep1. Find the LCD.Step 2. Change each of the fractions same as the LCD by multiplying the numerators as well as the denominator of each expression by any factors which make it equal to the LCD.Step 3. Add both of the numerators.Step 4. Simplify the numerator by factoring it, if possible.Example 1: Add and Solution: The LCD of x+2 and y is y(x+2)Multiply the numerators as well as the denominator of each expression by any factors which make it equal to the LCD * + * = + Add the numerators + = Example 2: Add + Solution: The LCD of is Multiply the numerators as well as the denominator of each expression by any factors which make it equal to the LCD * + * = + Add the numerators + = ExerciseAdd the following polynomial fractions + + + + + +