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Algebra II : Algebra II

Study concepts, example questions & explanations for Algebra II

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10 Diagnostic Tests 630 Practice Tests Question of the Day Flashcards Learn by Concept

Example Questions

Example Question #1163 : Mathematical Relationships And Basic Graphs

Solve for .

$5^{x+5}=625$

Possible Answers:

Correct answer:

Explanation:

When solving exponential equations, we need to ensure that we have the same base. When that happens, our equations our based on the exponents. We don't have the same base in this case, but we do know that

625=5^3 Therefore:

$5^{x+5}=5^3$ With the same base, we can now write

x+5=3 Subtract on both sides.

x=-2

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Example Question #51 : Solving Exponential Equations

Solve for .

$2^{4x+6}=1024$

Possible Answers:

Correct answer:

Explanation:

$1024=2^{10}$ therefore

$2^{4x+6}=2^{10}$ With the same base, we can now write:

4x+6=10 Subtract on both sides.

4x=4 Divide on both sides.

x=1

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Example Question #1171 : Mathematical Relationships And Basic Graphs

Solve for .

$8^{3x+4}=4^{2x-4}$

Possible Answers:

Correct answer:

Explanation:

8=2^3 and 4=2^2 . By choosing base , we will have the same base and set-up an equation.

$8^{3x+4}=4^{2x-4} \rightarrow(2^3)^{3x+4}=(2^2)^{2x-4}$ Apply power rule of exponents.

$2^{9x+12}=2^{4x-8}$ With the same base, we can now write

9x+12=4x-8 Subtract 4x, 12 on both sides.

5x=-20 Divide on both sides.

x=-4

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Example Question #61 : Solving And Graphing Exponential Equations

Solve for .

$27^{4x-12}=9^{x-3}$

Possible Answers:

Correct answer:

Explanation:

27=3^3, 9=3^2 therefore

$27^{4x-12}=9^{x-3} \rightarrow (3^3)^{4x-12}=(3^2)^{x-3}$ Apply power rule of exponents.

$3^{12x-36}=3^{2x-6}$ With the same base, we can now write

12x-36=2x-6 Subtract and add on both sides.

10x=30 Divide on both sides.

x=3

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Example Question #63 : Solving And Graphing Exponential Equations

Solve for .

$6^{6x+3}=\frac{1}{216}$

Possible Answers:

Correct answer:

Explanation:

$\frac{1}{216}=6^{-3}$ therefore

$6^{6x+3}=6^{-3}$ With the same base, we can now write

6x+3=-3 Subtract on both sides.

6x=-6 Divide on both sides.

x=-1

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Example Question #3831 : Algebra Ii

Solve for .

$4^{-x+5}=\frac{1}{256}$

Possible Answers:

Correct answer:

Explanation:

$\frac{1}{256}=4^{-4}$ therefore

$4^{-x+5}=4^{-4}$ With the same base, we now have

-x+5=-4 Subtract on both sides.

-x=-9 Divide on both sides.

x=9

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Example Question #1172 : Mathematical Relationships And Basic Graphs

Solve for .

$\frac{1}{25}^{3+x}=\frac{1}{125}^{-x+2}$

Possible Answers:

Correct answer:

Explanation:

$\frac{1}{25}=5^{-2}, \frac{1}{125}=5^{-3}$ By having a base of , this will make solving equations easier.

$(5^{-2})^{3+x}=(5^{-3})^{-x+2}$ Apply power rule of exponents.

$5^{-6-2x}=5^{3x-6}$ With the same base, we now can write

6-2x=3x+6 Add and subtract on both sides.

5x=0 Divide on both sides.

x=0

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Example Question #66 : Solving And Graphing Exponential Equations

Solve for .

$\frac{1}{8}^{2x+4}=8^{-x+2}$

Possible Answers:

Correct answer:

Explanation:

$\frac{1}{8}=8^{-1}$ therefore

$(8^{-1})^{2x+4}=8^{-x+2}$ Apply power rule of exponents.

$8^{-2x-4}=8^{-x+2}$ With the same base, we can now write

-2x-4=x+2 Add and subtract on both sides.

-3x=6 Divide on both sides.

x=-2

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Example Question #61 : Solving Exponential Equations

Solve for .

$7^{x+4}=7^{2x-3}$

Possible Answers:

Correct answer:

Explanation:

When solving exponential equations, we need to ensure that we have the same base. When that happens, our equations our based on the exponents.

$7^{x+4}=7^{2x-3}$ With the same base, we can now write

x+4=2x-3 Add and subtract on both sides.

x=7

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Example Question #701 : Exponents

Solve for .

$10^9=10^{x^2}$

Possible Answers:

$\pm9$

$\pm3$

Correct answer:

$\pm3$

Explanation:

When solving exponential equations, we need to ensure that we have the same base. When that happens, our equations our based on the exponents.

$10^9=10^{x^2}$ With the same base, we can now write

x^2=9 Take the square root on both sides. Account for negative answer.

$x=\pm3$

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Algebra II : Algebra II

Study concepts, example questions & explanations for Algebra II

All Algebra II Resources

Example Questions

Example Question #1163 : Mathematical Relationships And Basic Graphs

Example Question #51 : Solving Exponential Equations

Example Question #1171 : Mathematical Relationships And Basic Graphs

Example Question #61 : Solving And Graphing Exponential Equations

Example Question #63 : Solving And Graphing Exponential Equations

Example Question #3831 : Algebra Ii

Example Question #1172 : Mathematical Relationships And Basic Graphs

Example Question #66 : Solving And Graphing Exponential Equations

Example Question #61 : Solving Exponential Equations

Example Question #701 : Exponents

All Algebra II Resources

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