Power Rule of Exponents - Pre-Algebra

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Question

Simplify:

Answer

The product rule of exponents states that when you're multiplying two powers with the same base, you add the exponents:

$(x^a)(x^b)=x^{a+b}$

In this instance,

$(x^5)(x^8)=x^{5+8}=x^{13}$

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Question

Simplify:
$\small (x^3)^4$

Answer

The "power rule" states that when you raise a power to a power, you mutiploy the exponents:
$\small (x^a)^b=x^{a\times b}$

$\small (x^3)^4=x^{3\times4}=x^{12}$

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Question

Simplify:

$\left ( 3x^{2}y \right )^{3}$

Answer

Recall the Power Rule of Exponents: $\left ( x^{m} \right )^{n}=x^{mn}$ .*

To simplify the expression $\left ( 3x^{2}y \right )^{3}$ , use this rule to distribute the exponents:

$\left ( 3x^{2}y \right )^{3}=3^{3}x^{2*3}y^{3}=27x^{6}y^{3}$

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Question

Simplify:

$x^{5}\left ( x^{2}y \right )^{2}$

Answer

Recall the following rules:

The Product Rule of Exponents says: $x^{m}x^{n}=x^{m+n}$

The Power Rule of Exponents* says: _ $\left ( x^{m} \right )^{n}=x^{mn}$ _and $\left ( x^{m}y \right )^{n}=x^{mn}y^{n}$

Step 1: Use the Power Rule of Exponents to distribute the exponents:

$\left ( x^{2}y \right )^{2}=x^{22}y^{2}=x^{4}y^{2}$

Step 2: Use the Product Rule of Exponents* to simplify further:

$x^{5}x^{4}y^{2}=x^{5+4}y^{2}=x^{9}y^{2}$

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Question

Simplify:

$(2x^{2}y^{4})^{2}$

Answer

Distribute the exponent of 2 to each term:

$2^{2}x^{2\cdot 2}y^{4\cdot 2}$

Multiply the corresponding exponents:

$4x^{4}y^{8}$

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Question

Simplify.

$\frac{x^{8}}{x^{6}}$

Answer

The Quotient of Powers Property states when you divide two powers with the same base, you subtract the exponents.

In this case, the exponents are 8 and 6:

$x^{8-6}=x^{2}$

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Question

Simplify:

$\small \small (4xy^3z^2)^2$

Answer

Recall, to distribute exponents through a polynomial, you must multiply the exponents. Thus, our expression can be simplified as follows:

$\small \small (4xy^3z^2)^2$

$\small 4^{12}x^{12}y^{32}z^{22}$

$\small 4^2x^2y^6z^4$

$\small 16x^2y^6z^4$

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Question

Simplify:

$(5x^{2}y^{^{3}})^{2}$

Answer

Recall the Power Rule of Exponents: $(x^{m})^{n}= x^{mn}$

To simplify the expression $(5x^{2}y^{^{3}})^{2}$ , use this rule to distribute the exponents:

$(5x^{2}y^{^{3}})^{2} = 5^{2}x^{22}y^{3*2} = 25x^{4}y^{6}$

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Question

Simplify:

Answer

Recall the following rules:

The Product Rule of Exponents says: $x^m * x^n = x^{m+n}$

The Power Rule of Exponents says: $(x^m)^n = x^{m+n}$ and $(x^my)^n = x^{mn}y^n$

Step 1: Use the Power Rule of Exponents* to distribute the exponents:

$(x^3y^2)^2 = x^{32}y^{22} = x^6y^4$

Step 2: Use the Product Rule of Exponents to simplify further:

$x^4y(x^6y^4) = x^{4+6}y^{1+4} = x^{10}y^5$

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Question

Answer

First, distribute the exponent outside of the parentheses to each of the elements inside of the parentheses, including the 2.

Remember that in this case, when an exponent is raised to another power, the exponents multiply.

Now we need to mutiply that answer by the outside .

For this last step, remember that the exponents on the add.

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Question

What is the simplified version of the following polynomial?

$\small x^{24}* x^2 + 2^2 + 2^2$

Answer

The power rule of an exponent means that when two exponential expressions with the same base are multiplied, you add the exponents together. In this case,

$\small \small \small \small x^{24}*x^2 = x^{26}$

$\small x^{24}$ can be thought of as a "string" of 24 $\small x$ variables being multiplied together, so by multiplying that string by another 2 variable units, you have seamlessly extended the chain by two units.

For $\small 2^2 +2^2$ , it is important to remember that the power rule does no apply during addition, so the exponent is applied first, then the exponential values are added following the order of operation, so the final expression is:

$\small \small x^{24 +2} + 4+4$

or $\small x^{26} + 8$

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Question

Simplify: $\left (x^{-2} \right )^{-3}$

Answer

The general rule for taking a power to a power is just that you multiply the exponents. So for $\left (x^{-2} \right )^{-3}$ you'd just multiply .

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Question

Simplify the following expression:

$(2a^{3}b^{5}c^{2})^{3}$

Answer

When there is a product inside parenthesis and everything in the parenthesis is raised to a power, each term inside the parenthesis is taken to that power. If the terms inside the parenthesis are already raised to a power, multiply the exponents.

$(2a^{3}b^{5}c^{2})^{3}$

$=2^{3}a^{(33)}b^{(53)}c^{(2*3)}$

$=8a^{9}b^{15}c^{6}$

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Question

Combine the expression into the least amount of bases and powers:

$([(2x^2y)^{2}]^4)^{-1}$

Answer

The power rule of exponents states that $(a^m)^n=a^{mn}$ . In other words, one base "a" to two different powers is equal to "a" with its exponent being the product of those two powers.

Start from the middle and keep track of each power.

$([(2x^2y)^{2}]^4)^-1$

$((2^2x^{22}y^2)^4)^{-1}=((4x^4y^2)^4)^{-1}=((4^4x^{44}y^{24})^{-1})=(256x^{16}y^8)^{-1}$

Change to a positive exponent. $a^{-x}=\frac{1}{a^x}$ :

$(256x^{16}y^8)^{-1}=\frac{1}{(256x^{16}y^8)}$

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Question

Simplify the following expression:

$\left ( x^{3}\right )^{4} + \left ( y^{7}\right )^{2} - \left ( x^{2}\right )^{0}$

Answer

First, the zero-exponent rule states that anything raised to the zero power is equal to :

$\left ( x^{3}\right )^{4} + \left ( y^{7}\right )^{2} - \left ( x^{2}\right )^{0}$

$\left ( x^{3}\right )^{4} + \left ( y^{7}\right )^{2} - 1$

Next, use the power rule (to raise a power to a power, multiply the exponents) to simplify the and variable-containing terms. This gives the expression in its simplest form:

$\left ( x^{12}\right ) + \left ( y^{14}\right ) - 1$

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Question

Simplify this expression:

Answer

When an exponent is raised to another power or another exponent we multiply them together. This is called the power rule. $(a^m)^n=a^{mn}$ .

$(3x^2y^3)^3=(3^3x^{23}y^{3*3})=27x^6y^9$

Everything within the parenthesis is raised to the power of three.

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Question

Solve the equation.

Answer

When solving and exponent question first look at the sign in the equation.

When it's multiplication you have to add the exponents.

The base number in this case is 4. If the base number is the same leave it be and take it with you to the answer, if it is different then you have to do what the sign says. So in this case if they were different bases you would have to multiply them, however they are the same so take the 4 to the answer and add the exponents.

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Question

Simplify:

Answer

One way to solve this question is to write out the terms in this expression.

$(2x^3)^3= 2x^3\cdot2x^3\cdot2x^3 = 8x^9$

With the exponent rule, notice that can also be written as:

$(2x^3)^3= 2^3 \cdot x^{3\times3} = 8x^9$

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Question

Combine to one term: $a^4b^6 \times a^{-4} b^{-3}$

Answer

Since both terms are multiplied, the powers of each base can be added or subtracted.

According to the rules of exponents,

$a^n\times a^m=a^{n+m}$

Therefore, our terms can combine as follows.

$a^4b^6 \times a^{-4} b^{-3} =a^{4-4} b^{6-3} = a^0b^3 = b^3$

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Question

Solve: $6x^3 \times 4x^2$

Answer

Multiply the coefficients together.

$6\times4 =24$

Multiply $x^3 \times x^2$ . When multiplying powers of the same base, their powers can be added.

$x^3 \times x^2= x^5$

The answer is:

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