大象传媒

Expansion of bracketsRemoving pairs of brackets

Removing brackets is to multiply the term outside the brackets by each term inside - also known as the distributive law. Use FOIL to remove a pair of brackets then simplify by collecting like terms.

Part of MathsAlgebraic skills

Removing pairs of brackets

FOIL

When multiplying out a pair of brackets, multiply each term in the first bracket by each term in the second bracket.

So that this doesn't become too confusing, we use FOIL to help us.

  • First: Multiply the first terms from each bracket (1st term in 1st bracket with 1st term in 2nd bracket)
  • Outside: Multiply the two outside terms (1st term in 1st bracket with 2nd term in 2nd bracket)
  • Inside: Multiply the two inside terms (2nd term in 1st bracket with 1st term in 2nd bracket)
  • Last: Multiply the last terms from each bracket (2nd term in 1st bracket with 2nd term in 2nd bracket)

Example

Multiply and simplify \((2x + 5)(3x - 4)\)

Method 1

Diagram of expressions method (2x + 5) (3x - 4)

\((2x + 5)(3x - 4)\)

\(= (2x \times 3x) + (2x \times - 4) + (5 \times 3x) + (5 \times - 4)\)

\(= 6{x^2} - 8x + 15x - 20\)

\(= 6{x^2} + 7x - 20\)

Method 2

In this method, split the first bracket up to multiply the terms in the first bracket by the terms in the second bracket individually:

\((2x + 5)(3x - 4)\)

\(= 2x(3x - 4) + 5(3x - 4)\)

\(= 6{x^2} - 8x + 15x - 20\)

\(= 6{x^2} + 7x - 20\)

Now try the example questions below.

Question

Multiply out the following, then simplify.

\((3a+4) (2a+5)\)

Question

Multiply out the following, then simplify.

\((2y - 3)(5y + 7)\)

Question

Multiply out \({(2a - 5)^2}\) then simplify.

Question

Multiply out \({(3x + 4)^2}\) and simplify.

Question

Calculate the area of the rectangle below. All lengths are in cm.

Rectangle with sides measuring (x + 7) and (x + 4)

Question

Simplify the following:

\((x + 1)(3{x^2} - 4x + 1)\)