Question

How do you simplify $(x + 3) (y - 4) $?

Answer 1

Hint: We have multiplication of two polynomials that are $\left( {x + 3} \right)$ and $\left( {y - 4} \right)$. Both the polynomials have degree one, so they are called linear polynomials and they have two terms each, hence called binomials. To multiply polynomials, first multiply each term in one polynomial by each term in the other polynomial using distributive law. Then, simplify the resulting polynomial by adding or subtracting the like terms.

Complete step by step answer:
Given, $\left( {x + 3} \right)\left( {y - 4} \right)$. In the first polynomial, we have two terms and in the second polynomial also we have two terms. Multiply the first term of a polynomial with second polynomial and then the second term with second polynomial, we have,
$x\left( {y - 4} \right) + 3\left( {y - 4} \right)$
Opening the brackets and multiplying, we have,
$x \times y - 4 \times x + 3 \times y - 3 \times 4$
Simplifying the expression, we get,
$xy - 4x + 3y - 12$
Thus we have, $\left( {x + 3} \right)\left( {y - 4} \right) = xy - 4x + 3y - 12$.

Additional information: Degree of a polynomial is the highest of the degrees of the individual term with non-zero coefficients. We have different types of polynomials based on their degree such as: constant polynomial, linear polynomial, quadratic polynomial, cubic polynomial and quartic polynomial etc.

Note: For avoiding mistakes, write the terms in the decreasing order of their exponent. Thus we obtained a polynomial of degree two. Hence, the obtained polynomial is a quadratic polynomial. When we multiply two polynomials of any degree the obtained polynomial must have degree higher than multiplied individual polynomials. We can check this in the given above problem and it satisfies the condition.