Chapter 5, Problem 1MCP

To determine

The expression after performing the indicated operations.

Answer to Problem 1MCP

Solution:

After performing the indication operation, the given expression is determined to be $-55x^4{y}^6$.

Explanation of Solution

Given:

The algebraic expression $(11x^2{y}^3)(-5x^2{y}^3)$, the objective is to determine the expression after performing the indicated operations.

Concept used:

Term: A term is a number, variable or the product of a number and variable.

Coefficient: A coefficient is the numeric factor of the given term.

Constant term: A constant term is a term that contains only a number.

Degree of the term: The degree of the term is the sum of the exponents on the variables contained in the term.

Like terms: Like terms are those that have the exact same variables raised to the exact same exponents. When applying algebraic addition or subtraction to a given expression, only like terms can be combined and their coefficients added or subtracted respectively.

Product rule for exponents:

When multiplying terms of an expression, the exponents of like bases are added as follows,

  $x^m\cdot x^n=x^{m+n}$

Quotient rule for exponents:

Dividing like bases with exponents follows the quotient rule as follows:

  $\frac{x^m}{x^n}=x^{m-n}$ ; (note that $x^0=1$ ).

Calculation:

Description:	$(11x^2{y}^3)\cdot (-5x^2{y}^3)$
Step 1: Remove the brackets ( ) and simplify Step 2: To multiply monomials use the product rule, add the exponents of like bases. Here, the bases are x and y .	$(11x^2{y}^3)(-5x^2{y}^3)$ = $-5\times 11\times x^2{y}^3{x}^2{y}^3$ = $-55x^{2+2}{y}^{3+3}$ = $-55x^4{y}^6$

Conclusion:

After performing the indication operation, the given expression is determined to be $-55x^4{y}^6$.