Algebra of Functions - Pre-Calculus

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Question

Evaluate

Answer

When adding two expressions, you can only combine terms that have the same variable in them.

In this question, we get:

Now we can add each of the results to get the final answer:

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Question

Fully expand the expression:

Answer

The first step is to rewrite the expression:

Now that it is expanded, we can FOIL (First, Outer, Inner, Last) the expression:

First : $x\cdot x = x^2$

Outer: $x\cdot4 = 4x$

Inner: $4\cdot x = 4x$

Last: $4\cdot 4 = 16$

Now we can simply add up the values to get the expanded expression:

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Question

Simplify the following expression:

$\frac{9x^2+18x+9}{3x+3}+(x-1)$ .

Answer

First, we can start off by factoring out constants from the numerator and denominator.

$\frac{9(x^2+2x+1)}{3(x+1)}$

The 9/3 simplifies to just a 3 in the numerator. Next, we factor the top numerator into , and simplify with the denominator.

$\frac{3(x^2+2x+1)}{(x+1)}=\frac{3(x+1)(x+1)}{(x+1)}$

We now have

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Question

Simplify the expression:

.

Answer

First, distribute the -5 to each term in the second expression:

Next, combine all like terms

to end up with

.

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Question

If and , what does $\frac{f(x)}{g(x)}$ equal?

Answer

We begin by factoring and we get .

Now, When we look at $\frac{f(x)}{g(x)}$ it will be $\frac{(3x-4)(x+7)}{(x+7)}$ .

We can take out from the numerator and cancel out the denominator, leaving us with .

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Question

If and , then what is equal to?

Answer

First, we must determine what is equal to. We do this by distributing the 3 to every term inside the parentheses,.

Next we simply subtract this from , going one term at a time:

Finally, combining our terms gives us .

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Question

Fully expand the expression: $(x+7)^{2}$

Answer

In order to fully expand the expression $(x+7)^{2}$ , let's first rewrite it as:

.

Then, using the FOIL(First, Outer, Inner, Last) Method of Multiplication, we expand the expression to:

First: $x\times x=x^{2}$

Outer: $x\times7=7x$

Inner: $7\times x=7x$

Last: $7\times7=49$

$x^{2}+7x+7x+49$ , which in turn

$=x^{2}+14x+49$

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Question

Simplify the following expression: $(6x^{3}-3x^{2}+4x+9)-(6x^{3}-5x^{2}+7x+8)$

Answer

To simplify the above expression, we must combine all like terms:

$(6x^{3}-3x^{2}+4x+9)-(6x^{3}-5x^{2}+7x+8)$

$x^{3}$ : $6x^{3}-6x^{3}=0$

$x^{2}$ : $-3x^{2}-(-5x^{2})=-3x^{2}+5x^{2}=2x^{2}$

:

Integers:

Putting all of the above terms together, we simplify to:

$2x^{2}-3x+1$

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Question

If $f(x)=5x^{2}-15$ and $g(x)=12x^{2}-36$ , what is $\frac{f(x)}{g(x)}$ ?

Answer

Given the information in the above problem, we know that:

$\frac{f(x)}{g(x)}=\frac{5x^{2}-15}{12x^{2}-36}$

Factoring the resulting fraction, we get:

$\frac{5x^{2}-15}{12x^{2}-36}$

$=\frac{5(x^{2}-3)}{12(x^{2}-3)}$

$=\frac{5}{12}$

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Question

Simplify the following:

Answer

To simplify the expression, distribute the negative into the second parentheses, and then combine like terms.

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Question

Simplify the following completely:

Answer

To simlify adding polynomials, simply drop the parentheses and add like terms.

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Question

Determine the sum of: $\frac{a+b}{c}+ \frac{c}{a}$

Answer

To add the numerators, the denominators must be common.

The least common denominator can be determined by multiplication.

$a\times c= ac$

Rewrite the fractions.

$\frac{a+b}{c}+ \frac{c}{a} = \frac{a(a+b)}{ac}+\frac{c(c)}{ac} = \frac{a^2+ab+c^2}{ac}$

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Question

Given and ,

Complete the operation given by .

Answer

Given and

Complete the operation given by .

Begin by realizing what this is asking. We need to combine our two functions in such a way that we find the difference between them.

When doing so remember to distribute the negative sign that is in front of to each term within the polynomial.

$\(2x^3+5x^2-26)-(x^2-3x+7)\ \=2x^3+5x^2-26-x^2+3x-7\ \=2x^3+4x^2+3x-33$

So, by simplifying the expression, we get our answer to be:

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Question

Given and ,

Evaluate and simplify .

Answer

Given and ,

Evaluate and simplify .

Begin by multiplying by 2:

Next, add to what we got above and combine like terms.

$\4x^3+10x^2-52+(x^2-3x+7)\ \=4x^3=10x^2+x^2-3x-52+7\ \=4x^3+11x^2-3x-45$

This makes our answer

.

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Question

Given and , find .

Answer

Given and , find .

To complete this problem, we need to recall FOIL. FOIL states to multiply the terms in each binomial together in the order of first, outer, inner, and last.

$y(t)b(t)=(t^3-8t) (5t^7+8t^2)={\color{Blue} t^35t^7}+{\color{Red} t^38t^2}+{\color{Magenta} -8t5t^7}+{\color{DarkOrange} -8t8t^2}$

${\color{Blue} t^35t^7}+{\color{Red} t^38t^2}+{\color{Magenta} -8t5t^7}+{\color{DarkOrange} -8t*8t^2}=5t^{10}+8t^5-40t^8-64t^3$

We have no like terms to combine, so our answer is:

$5t^{10}-40t^8+8t^5-64t^3$

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Question

Determine $\small f+g$

if

$\small f(x)=3x$ and $\small g(x)=7$

Answer

is defined as the sum of the two functions and $\small g(x)$ .

As such

$\small f+g=f(x)+g(x)=3x+7$

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Question

Determine $\small f+g$

if

$\small \small f(x)=5x^2$ and $\small \small g(x)=6x^2$

Answer

is defined as the sum of the two functions and $\small g(x)$ .

As such

$\small \small f+g=f(x)+g(x)=5x^2+6x^2=11x^2$

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Question

Simplify $f(x)\cdot g(x)$ given,

Answer

To solve $f(x)\cdot g(x)$ , simply multiply your two functions. Thus,

$\ f(x)\cdot g(x)=(x^2+2)(x+6)=(x^2)(x)+(6)(x^2)+(2)(x)+(2)(6) \ \ =x^3+6x^2+2x+12$

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Question

Add the following functions:

Answer

To add, simply combine like terms. Thus, the answer is:

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Question

Given the functions: and , what is ?

Answer

For , substitute the value of inside the function for and evaluate.

For , substitute the value of inside the function for and evaluate.

Subtract .

The answer is:

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