Rational Exponents - Pre-Calculus

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Question

Simplify

$\frac{9^{\frac{2}{3}}\cdot 3^{\frac{5}{3}}}{6^{2}}$

Answer

$\frac{9^{\frac{2}{3}}\cdot 3^{\frac{5}{3}}}{6^{2}}=\frac{(3^{2})^{\frac{2}{3}}\cdot3^{\frac{5}{3}}}{6^{2}}=\frac{3^{\frac{4}{3}}\cdot 3^{\frac{5}{3}}}{6^{2}}$

$=\frac{3^\frac{9}{3}}{6^2}=\frac{3^3}{6^2}=\frac{27}{36}=\frac{3}{4}$ .

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Question

Simplify the expression:

$\frac{2^\frac{5}{3}\cdot 4^\frac{2}{3}\cdot 8^\frac{1}{3}}{5^\frac{1}{3}\cdot 25^\frac{1}{3}}$ .

Answer

First, you can begin to simplfy the numerator by converting all 3 expressions into base 2.

$2^\frac{5}{3}\cdot (2^2)^\frac{4}{3}\cdot (2^3)^\frac{1}{3}$ , which simplifies to

$2^3\cdot 2 =16$

For the denominator, the same method applies. Convert the 25 into base 5, and when simplified becomes simply 5.

$5^{\frac{1}{3}}\cdot 5^{2\cdot \frac{1}{3}}$

$5^{\frac{1}{3}+\frac{2}{3}}=5^1=5$

The final simplified answer becomes:

$\frac{\text{Numerator}}{\text{Denominator}} = \frac{16}{5}$

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Question

Evaluate the following expression using knowledge of the properties of exponents:

$8^\frac{2}{3}+(2^2)^2-(3)^3\left(\frac{1}{3}\right)^3+\frac{5^{19}}{5^{17}}-647^0$

Answer

Let's work through this equation involving exponents one term at a time. The first term we see is $8^\frac{2}{3}$ , for which we can apply the following property:

$a^\frac{c}{b}=\sqrt[b]{a^c}=(\sqrt[b]{a})^c$

So if we plug our values into the formula for the property, we get:

$8^\frac{2}{3}=\sqrt[3]{8^2}=(\sqrt[3]{8})^2=(2)^2=4$

Because . Our next term is , for which we'll need the property:

$(a^b)^c=a^{bc}$

Using the values for our term, we have:

$(2^2)^2=2^4=2\cdot 2\cdot 2\cdot 2=16$

The third term of the equation is $(3)^3\left(\frac{1}{3}\right)^3$ , for which the quickest way to evaluate would be using the following property:

Using the values from our term, this gives us:

$(3)^3(\frac{1}{3})^3=(3\cdot \frac{1}{3})^3=(1)^3=1$

The next property we will need to consider for our fourth term is given below:

$\frac{a^b}{a^c}=a^{b-c}$

If we plug in the corresponding values from our term, we get:

$\frac{5^{19}}{5^{17}}=5^{19-17}=5^2=25$

Finally, our last term requires knowledge of the following simple property: Any number raised to the power of zero is 1. With this in mind, our last term becomes:

Rewriting the equation with all of the values we've just evaluated, we obtain our final answer:

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Question

Simplify the expression.

$\frac{x^{3/2}y^{7/3}}{x^3 y^{2/9}}$

Answer

Using the properties of exponents, we can either choose to subtract the exponents of the corresponding bases or rewrite the expression using negative exponents as such:

$x^{3/2}x^{-3}y^{7/3}y^{-2/9}$

Here, we combine the terms with corresponding bases by adding the exponents together to get

$x^{-3/2}y^{19/9}$

Placing the x term (since it has a negative exponent) in the denominator will result in the correct answer. It can be shown that simply subtracting the exponents of corresponding bases will result in the same answer.

$\frac{y^{19/9}}{x^{3/2}}$

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Question

Solve:

$3x^{\frac{3}{4}} = x^{\frac{1}{2}}$

Answer

To remove the fractional exponents, raise both sides to the second power and simplify:

$(3x^{\frac{3}{4}})^{2} = (x^{\frac{1}{2}})^{2}$

$9x^{\frac{3}{2}} = x$

$\frac{9x^{\frac{3}{2}}}{x} = \frac{x}{x}$

$9x^{\frac{1}{2}} = 1$

Now solve for :

$\frac{9x^{\frac{3}{2}}}{9} = \frac{1}{9}$

$x^{\frac{1}{2}} = \frac{1}{9}$

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

$x = \frac{1}{81}$

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Question

Solve:

$x^{\frac{1}{3}} = 2$

Answer

To remove the rational exponent, cube both sides of the equation:

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

Now simplify both sides of the equation:

$x^{\frac{1}{3}\cdot 3} = 2^{3}$

$x^{1} = 2^{3}$

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Question

Evaluate the following expression and solve for .

$343=7^{15t-27}$

Answer

To solve this problem, recall that you can set exponents equal to eachother if they have the same base.

See below:

So, we have

$7^3=7^{15t-27}$

Because both sides of this equation have a base of seven, we can set the exponents equal to eachother and solve for t.

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Question

Simplify the expression $4^{2.5}$ .

Answer

We proceed as follows

$4^{2.5}$

Write as a fraction

$4^{5/2}$

The denominator of the fraction is a , so it becomes a square root.

$(^2\sqrt{4})^5$

Take the square root.

Raise to the power.

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Question

Solve for .

$2^{x/3}\cdot 3^{x/4}\cdot e^{-x}=3$

Answer

We begin by taking the natural log of the equation:

$\ln(2^{x/3}\cdot 3^{x/4}\cdot e^{-x})=\ln3$

Simplifying the left side of the equation using the rules of logarithms gives:

$\frac{x}{3}\ln2+\frac{x}{4}\ln3-x=\ln3$

We group the x terms to get:

$x\left(\frac{1}{3}\ln2+\frac{1}{4}\ln3-1\right)=\ln3$

We reincorporate the exponents into the logarithms and use the identity property of the natural log to obtain:

$x(\ln2^{1/3}+\ln3^{1/4}+\ln e^{-1})=\ln3$

We combine the logarithms using the multiplication/sum rule to get:

$x\ln(2^{1/3} 3^{1/4}e^{-1})=\ln3$

We then solve for x:

$x=\frac{\ln3}{\ln(2^{1/3}3^{1/4}e^{-1})}\approx-2.223$

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Question

Solve for .

$x^{5/2}-12x^{3/2}+20x^{1/2}=0$

Answer

We begin by factoring out the term $x^{1/2}$ to get:

$x^{1/2}(x^2-12x+20)=0$

This equation gives our first solution:

$x^{1/2}=0\Rightarrow x=0$

Then we check for more solutions:

$\x^2-12x+20=0 \ \Rightarrow (x-10)(x-2)=0\ \Rightarrow x=2,10$

Therefore our solution is

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Question

Evaluate $\frac{3xz^{\frac{1}{3}}}{(6x)^{\frac{1}{2}}y^{2}z^{3}}$ when $x=2,y=3^{\frac{1}{4}}, z=8$

Answer

Remember the denominator of a rational exponent is equivalent to the index of a root.

This should simplify quite nicely.

$\frac{3xz^{\frac{1}{3}}}{(6x)^{\frac{1}{2}}y^{2}z^{3}}=\frac{3x^{1/2}}{\sqrt{2\cdot3}y^2z^{8/3}}=\frac{\sqrt{3x}}{\sqrt{2}y^2\sqrt[3]{z^{8}}}$

When $x=2,y=3^{\frac{1}{4}}, z=8$ it gives us,

$\frac{\sqrt{3\cdot2}}{\sqrt{2}(3^{\frac{1}{4}})^2\sqrt[3]{8^{8}}}=\frac{\sqrt{3}}{(3^{\frac{2}{4}})2^{8}}=\frac{1}{2^8}=\frac{1}{256}$

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Question

What is the value of $32^{\frac{3}{5}}$ ?

Answer

Recall that when considering rational exponents, the denominator of the fraction tells us the "root" of the expression.

Thus in this case we are taking the fifth root of .

The fifth root of is , because $2\cdot2\cdot2\cdot2\cdot2 = 32$ .

Thus, we have reduced our expression to $2^3 = 2\cdot2\cdot2 = 8$ .

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Question

What is the value of $125^\frac{1}{3}$ ?

Answer

What does an exponent of one-third mean? Consider our expression and raise it to the third power.

$(125^\frac{1}{3})^3 = x^3$

Simplifying, we get:

Thus, we are looking for a number that when cubed, we get . Thus, we are discussing the cube root of , or .

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Question

Simplify the expression: $\frac{2x^3y^4}{6x^4y}$

Answer

$\frac{2x^3y^4}{6x^4y}$

Simplify the constants:

$\frac{x^3y^4}{3x^4y}$

Subtract the "x" exponents:

$\frac{y^4}{3xy}$

$x^3-x^4=x^{3-4}=x^{-1}=\frac{1}{x}$ This is how the x moves to the denominator.

Finally subtract the "y" exponents:

$\frac{y^3}{3x}$

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Question

Simplify and rewrite with positive exponents:

$\frac{2a^3b^{28}c^2d^2e^4f}{3a^2b^{27}cd^3e^5f^2}$

Answer

$\frac{2a^3b^{28}c^2d^2e^4f}{3a^2b^{27}cd^3e^5f^2}$

When dividing two exponents with the same base we subtract the exponents:

$\frac{2abcd^{-1}e^{-1}f^{-1}}{3}$

Negative exponents are dealt with based on the rule

$a^{-m}=\frac{1}{a^m}$ :

$\mathbf{\frac{2abc}{3def}}$

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Question

Simplify:

$\frac{8xy^2}{2x^4y}*x^2y^3$

Answer

Subtract the "x" exponents and the "y" exponents vertically. Then add the exponents horizontally if they have the same base (subtract the "x" and subtract the "y" ones). Finally move the negative exponent to the denominator.

$\frac{8xy^2}{2x^4y}x^2y^3\rightarrow 4x^{-3}yx^2y^3\rightarrow 4x^{-1}y^4=\frac{4y^4}{x}$

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Question

Simplify the function:

$y = ((x+2)^{1/2})^2$

Answer

When an exponent is raised to the power of another exponent, just multiply the exponents together.

$y = (x^a)^b = x^{ab}$

$y = ((x+2)^{1/2})^2 = (x+2)^1$

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Question

Simplify the function:

$y = [((2x+7)^{1/4})^3]^4$

Answer

When an exponent is raised to the power of another exponent, just multiply the exponents together.

$y = (x^a)^b = x^{ab}$

$y = [((2x+7)^{1/4})^3]^4 = ((2x+7)^{1/4})^{12} = (2x+7)^3$

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Question

Simplify the function:

$y = [((-7x+12)^{1/3})^3]^7$

Answer

When an exponent is raised to the power of another exponent, just multiply the exponents together.

$y = (x^a)^b = x^{ab}$

$y = [((-7x+12)^{1/3})^3]^7 = ((-7x+12)^{1/3})^{21}$

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