PSAT Math - How to use FOIL in the distributive property

Given the equation above, what is the value of ?

Explanation

Use FOIL to expand the left side of the equation.

From this equation, we can solve for , , and .

$18x^2=ax^2\rightarrow a=18$

$24x=dx\rightarrow d=24$

Plug these values into to solve.

Expand the expression:

$\dpi{100} \small (x^{3}-4x)(6 + 12x^{2})$

$\dpi{100} \small 12x^{5}-42x^{3}-24x$

$\dpi{100} \small 42x^{3}+12x^{5}-24x$

$\dpi{100} \small 6x^{3} + 12x^{5}-24x-48x^{3}$

$\dpi{100} \small 6x^{3} + 12x^{2}-24x-48$

$\dpi{100} \small 22x^{2}$

Explanation

When using FOIL, multiply the first, outside, inside, then last expressions; then combine like terms.

$\dpi{100} \small (x^{3}-4x)(6 + 12x^{2})$

$\dpi{100} \small 6x^{3}+12x^{5}-24x-48x^{3}$

$\dpi{100} \small -42x^{3}+12x^{5}-24x$

$\dpi{100} \small 12x^{5}-42x^{3}-24x$

Expand and simplify the expression.

$8x^{2}-200$

$8x^{2}-80x-200$

$8x^{2}-40x+200$

$8x^{2}-200x$

Explanation

We can solve by FOIL, then distribute the $\small 4$ . Since all terms are being multiplied, you will get the same answer if you distribute the $\small 4$ before using FOIL.

First:

Inside:

Outside:

Last:

Sum all of the terms and simplify. Do not forget the $\small 4$ in front of the quadratic!

Finally, distribute the $\small 4$ .

Simplify the expression.

None of the other answers

Explanation

Solve by applying FOIL:

First: 2x2 * 2y = 4x2y

Outer: 2x2 * a = 2ax2

Inner: –3x * 2y = –6xy

Last: –3x * a = –3ax

Add them together: 4x2y + 2ax2 – 6xy – 3ax

There are no common terms, so we are done.

If , , and $h(x) = f(x) \times g(x)$ , then

$6x^{2} +5x-6$

$6x^{2}-4x-6$

$6x^{2} + 9x +6$

Explanation

To find what equals, you must know how to multiply times , or, you must know how to multiply binomials. The best way to multiply monomials is the FOIL (first, outside, inside, last) method, as shown below:

$h(x) = f(x)\times g(x) = (3x-2)\times (2x+3)$

Multiply the First terms

$3x\cdot 2x= 6x^{2}$

Multiply the Outside terms:

$3x\cdot3 = 9x$

Multiply the Inside terms:

$-2\cdot2x = -4x$

Note: this step yields a negative number because the product of the two terms is negative.

Multiply the Last terms:

$-2\cdot3=-6$

Note: this step yields a negative number too!

Putting the results together, you get:

$(3x-2)\times (2x+3) = 6x^{2} +9x-4x -6$

Finally, combine like terms, and you get:

$h(x) = 6x^{2} +5x-6$

The sum of two numbers is . The product of the same two numbers is . If the two numbers are each increased by one, the new product is . Find in terms of ___.