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HiSET: Math : Irrational numbers

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Example Question #1 : Properties Of Operations With Real Numbers

Simplify the expression

$\frac{6}{\sqrt{12}}$

Possible Answers:

$\sqrt{6}$

$\sqrt{3}$

$\sqrt{2}$

Correct answer:

$\sqrt{3}$

Explanation:

An expression with a radical expression in the denominator is not simplified, so to simplify, it is necessary to rationalize the denominator. This is accomplished by multiplying both numerator and denominator by the given square root, $\sqrt{12}$ , as follows:

$\frac{6}{\sqrt{12}} = \frac{6 \times \sqrt{12}}{\sqrt{12} \times \sqrt{12}} = \frac{6 \times \sqrt{12}}{12}$

$\sqrt{12}$ can be simplified by taking the prime factorization of 12, and taking advantage of the Product of Radicals Property.

$12 = 2\times 2 \times 3$ , so

$\sqrt{12} = \sqrt{2 \times 2 \times 3 } = \sqrt{2 \times 2 } \times \sqrt{ 3 } = 2\sqrt{ 3 }$

Returning to the original expression and substituting:

$\frac{6 \times \sqrt{12}}{12} = \frac{6 \times 2 \sqrt{3}}{12} = \frac{12 \sqrt{3}}{12} =\sqrt{3}$ ,

the correct response.

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Example Question #1 : Properties Of Operations With Real Numbers

Consider the expression $\frac{2\sqrt{6} }{ 3 \sqrt{5}}$ .

To simplify this expression, it is necessary to first multiply the numerator and the denominator by:

Possible Answers:

$3 - \sqrt{5}$

$3+\sqrt{5}$

$\sqrt{6}$

$\sqrt{5}$

$\sqrt{30}$

Correct answer:

$\sqrt{5}$

Explanation:

When simplifying an fraction with a denominator which is the product of an integer and a square root expression, it is necessary to first rationalize the denominator. This is accomplished by multiplying both halves of the fraction by the square root expression. The correct response is therefore $\sqrt{5}$ .

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Example Question #1 : Irrational Numbers

Multiply: $(7+2 \sqrt{7})(7-2 \sqrt{7})$

Possible Answers:

Correct answer:

Explanation:

The two expressions comprise the sum and the difference of the same two expressions, and can be multiplied using the difference of squares formula:

$(7+2 \sqrt{7})(7-2 \sqrt{7})$

$= 7^{2} -(2 \sqrt{7})^{2}$

The second expression can be rewritten by the Power of a Product Property:

$= 7^{2} -2^{2}( \sqrt{7})^{2}$

The square of the square root of an expression is the expression itself:

=49 -4 (7)

By order of operations, multiply, then subtract:

=49 -28

= 21

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Example Question #1 : Irrational Numbers

Multiply: $\left ( \sqrt{7x}-\sqrt{3x} \right )\left ( \sqrt{7x}+\sqrt{3x} \right )$ .

Possible Answers:

11x

$11\sqrt{x}$

$4\sqrt{x}$

Correct answer:

Explanation:

The two expressions comprise the sum and the difference of the same two expressions, and can be multiplied using the difference of squares formula:

$\left ( \sqrt{7x}-\sqrt{3x} \right )\left ( \sqrt{7x}+\sqrt{3x} \right )$

$= ( \sqrt{7x})^{2}-(\sqrt{3x} )^{2 }$

The square of the square root of an expression is the expression itself:

= 7x - 3x

By distribution:

= (7-3)x

= 4x

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Example Question #1 : Properties Of Operations With Real Numbers

Multiply: $\left (2 + \sqrt{2x} \right )\left (2 - \sqrt{2x} \right )$

Possible Answers:

4 + 2x

4 - 2x

$4- 2x^{2}$

None of the other choices gives the correct response.

$4+2x^{2}$

Correct answer:

4 - 2x

Explanation:

The two expressions comprise the sum and the difference of the same two expressions, and can be multiplied using the difference of squares formula:

$\left (2 + \sqrt{2x} \right )\left (2 - \sqrt{2x} \right )$

$= 2^{2} - (\sqrt{2x} )^{2}$

The square of the square root of an expression is the expression itself, so:

= 4 - 2x

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Example Question #1 : Properties Of Operations With Real Numbers

Simplify the expression:

$\frac{10}{\sqrt{15}}$

Possible Answers:

$\frac{10\sqrt{15}}{15}$

$\frac{\sqrt{60}}{3}$

$\frac{2\sqrt{15}}{3}$

$\sqrt{\frac{20}{3}}$

$\sqrt{\frac{60}{9}}$

Correct answer:

$\frac{2\sqrt{15}}{3}$

Explanation:

$\frac{10}{\sqrt{15}} = \frac{10 \times \sqrt{15}}{\sqrt{15} \times \sqrt{15}} = \frac{10 \sqrt{15}}{15}$

The expression can be simplified further by dividing the numbers outside the radical by greatest common factor 5:

$\frac{10 \sqrt{15}}{15} = \frac{(10 \div 5) \sqrt{15}}{15 \div 5} = \frac{2 \sqrt{15}}{3}$

This is the correct response.

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Example Question #2 : Properties Of Operations With Real Numbers

Simplify:

$\sqrt{66}$

Possible Answers:

$3 \sqrt{11}$

$22\sqrt{3}$

$11 \sqrt{6}$

$2 \sqrt{11}$

The expression is already simplified.

Correct answer:

The expression is already simplified.

Explanation:

To simplify a radical expression, first find the prime factorization of the radicand, which is 66 here.

$66 = 2 \times 3 \times 11$

$\sqrt{66} =\sqrt{ 2 \times 3 \times 11}$

There are no repeated prime factors, so the expression is already in simplified form.

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Example Question #1 : Properties Of Operations With Real Numbers

Simplify the sum:

$\sqrt{99}+ \sqrt{44}+ \sqrt{11}$

Possible Answers:

$14\sqrt{11}$

$13\sqrt{11}$

$6\sqrt{11}$

$5\sqrt{11}$

The expression cannot be simplified further.

Correct answer:

$6\sqrt{11}$

Explanation:

To simplify a radical expression, first find the prime factorization of the radicand. First, we will simplify $\sqrt{99}$ as follows:

$99 = 3 \times 3 \times 11$

Pair up like factors, then apply the Product of Radicals Property.

$\sqrt{99} =\sqrt{ 3 \times 3 \times 11} = \sqrt{ 3 \times 3} \times \sqrt{ 11} = 3\sqrt{ 11}$

By similar reasoning,

$44 = 2 \times 2 \times 11$

$\sqrt{44} =\sqrt{ 2 \times 2 \times 11} = \sqrt{ 2 \times 2} \times \sqrt{ 11} = 2\sqrt{ 11}$

11 is a prime number, so $\sqrt{11}$ cannot be simplified. We can replace it with $1\sqrt{11}$ .

Through substitution, and the distribution property:

$\sqrt{99}+ \sqrt{44}+ \sqrt{11}$

$= 3\sqrt{ 11} + 2\sqrt{ 11} + 1 \sqrt{ 11}$

$= (3 + 2 + 1 )\sqrt{ 11}$

$= 6\sqrt{ 11}$

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Example Question #3 : Properties Of Operations With Real Numbers

Simplify:

$\sqrt{32}$

Possible Answers:

$4\sqrt{8}$

$4\sqrt{2}$

$8\sqrt{2}$

The expression is already simplified.

$2\sqrt{8}$

Correct answer:

$4\sqrt{2}$

Explanation:

To simplify a radical expression, first find the prime factorization of the radicand, which is 32 here.

$32 = 2 \times 2 \times 2 \times 2 \times 2$

Pair up like factors, then apply the Product of Radicals Property:

$\sqrt{32} = \sqrt{2 \times 2} \times\sqrt{ 2 \times 2} \times \sqrt{2 }= 2 \times 2 \times \sqrt{2 } = 4 \sqrt{2 }$ ,

the simplest form of the radical.

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Example Question #1 : Irrational Numbers

Simplify the difference:

$\sqrt{176} - \sqrt{11}$

Possible Answers:

$4\sqrt{11}$

None of the other choices gives the correct response.

$15\sqrt{11}$

$16\sqrt{11}$

$3\sqrt{11}$

Correct answer:

$3\sqrt{11}$

Explanation:

To simplify a radical expression, first find the prime factorization of the radicand. First, we will simplify $\sqrt{176}$ as follows:

$176 = 2 \times 2 \times 2 \times 2 \times 11$

By the Product of Radicals Property,

$\sqrt{176 }$

$= \sqrt{ 2 \times 2 \times 2 \times 2 \times 11}$

$= \sqrt{2 \times 2} \times \sqrt{2 \times 2} \times \sqrt{11 }$

$=2 \times 2 \times \sqrt{11 }$

$= 4 \sqrt{11}$

11 is a prime number, so $\sqrt{11}$ cannot be simplified. We can replace it with $1\sqrt{11}$ .

Through substitution, and the distribution property:

$\sqrt{176} - \sqrt{11}$

$= 4 \sqrt{11} -1 \sqrt{11}$

$=( 4 -1 )\sqrt{11}$

$=3\sqrt{11}$

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HiSET: Math : Irrational numbers

Study concepts, example questions & explanations for HiSET: Math

All HiSET: Math Resources

Example Questions

Example Question #1 : Properties Of Operations With Real Numbers

Example Question #1 : Properties Of Operations With Real Numbers

Example Question #1 : Irrational Numbers

Example Question #1 : Irrational Numbers

Example Question #1 : Properties Of Operations With Real Numbers

Example Question #1 : Properties Of Operations With Real Numbers

Example Question #2 : Properties Of Operations With Real Numbers

Example Question #1 : Properties Of Operations With Real Numbers

Example Question #3 : Properties Of Operations With Real Numbers

Example Question #1 : Irrational Numbers

All HiSET: Math Resources

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