Pre-Algebra - Irrational Numbers

Which of the following is an irrational number?

$\sqrt{79}$

$\sqrt{10000}$

$\sqrt{\frac{175}{{7}}}$

Explanation

An irrational number is any number that cannot be written as a fraction of whole numbers. The number pi and square roots of non-perfect squares are examples of irrational numbers.

can be written as the fraction $\frac{13}{4}$ . The term $\sqrt{\frac{175}{7}} = \sqrt{25} = 5$ is a whole number. The square root of is , also a rational number. , however, is not a perfect square, and its square root, therefore, is irrational.

Which of the following is an irrational number?

$\sqrt2$

$1.\bar{9}$

$\frac{7}{4}$

Explanation

An irrational number is any number that can not be expressed as a ratio of integers, i.e. a fraction. Therefore, the only irrational number listed is $\sqrt2$ .

Which of the following is an irrational number?

$\pi$

$0.\overline{3333}$

$\sqrt{9}$

$\frac{21}{5}$

Explanation

A rational number can be expressed as a fraction of integers, while an irrational number cannot.

$0.\overline{3333}$ can be written as $\frac{1}{3}$ .

$\sqrt{9}$ is simply , which is a rational number.

The number can be rewritten as a fraction of whole numbers, $\frac{23}{4}$ , which makes it a rational number.

$\frac{21}{5}$ is also a rational number because it is a ratio of whole numbers.

The number, $\pi$ , on the other hand, is irrational, since it has an irregular sequence of numbers (...) that cannot be written as a fraction.

Which of the following is closest to the value of the expression $\sqrt{77 - 17 + 14}$ ?

The expression is undefined in the real numbers.

Explanation

$\sqrt{77 - 17 + 14}$

$= \sqrt{60 + 14}$

$= \sqrt{74}$

Since ,

$8 < \sqrt{74} < 9$ .

We can determine which is closer by evaluating $8.5 ^{2} = 8.5 \times 8.5 = 72.25$ .

Since , 9 is the closer integer, and it is the correct choice.

Of the following, which is an irrational number?

$\sqrt{5}$

Explanation

The definition of an irrational number is a number which cannot be expressed in a simple fraction, or a number that is not rational.

Using the above definition, we see that $\frac{1}{2}$ is already expressed as a simple fraction.

$-1.5 = -\frac{3}{2}$

$0\div$ any number and

$3 = \frac{3}{1}$ . All of these options can be expressed as simple fractions, making them all rational numbers, and the incorrect answers.

$\sqrt{5}$ cannot be expressed as a simple fraction and is equal to a non-terminating, non-repeating (ever-changing) decimal, begining with

This is an irrational number and our correct answer.

Which of the following numbers is considered to be an irrational number?

$\sqrt{25}$

$\frac{2}{5}$

$\sqrt{0.25}$

Explanation

An irrational number cannot be represented as the quotient of two integers.

Irrational numbers do not terminate and are not repeat numbers.

Looking at the possible answers,

$\sqrt{25}$ can be reduced to $\sqrt{25}=\sqrt{5\cdot 5}=5$ , therefore it is an integer.

$\frac{2}{5}$ by definition is a quotient of two integers and thus it is not an irrational number.

$\sqrt{0.25}$ can be rewritten as $\sqrt{\frac{1}{4}}=\frac{1}{2}$ and by definition is a quotient of two integers and thus it is not an irrational number.

is a terminated decimal and therefore can be written as a fraction. Thus it is not an irrational number.

is the number for $\pi$ and does not terminate, therefore it is irrational.

Which of the following is NOT an irrational number?

$\sqrt{4}$

$\sqrt{5}$

$\sqrt{2}$

$\sqrt{10}$

$\sqrt{7}$

Explanation

Rational numbers are those which can be written as a ratio of two integers, or simply, as a fraction.

The solution of $\sqrt{4}$ is , which can be written as $\frac{2}1{}$ . Each of the other answers would have a solution with an infinite number of decimal points, and therefore cannot be written as a simple ratio. They are irrational numbers.

Of the following, which is a rational number?

$\sqrt{4}$

$\sqrt{2}$

$\pi$

Explanation

A rational number is any number that can be expressed as a fraction/ratio, with both the numerator and denominator being integers. The one limitation to this definition is that the denominator cannot be equal to .

Using the above definition, we see $\sqrt{2}$ , and $\pi$ (which is ) cannot be expressed as fractions. These are non-terminating numbers that are not repeating, meaning the decimal has no pattern and constantly changes. When a decimal is non-terminating and constantly changes, it cannot be expressed as a fraction.

$\sqrt{4}$ is the correct answer because $\sqrt{4}=2$ , which can be expressed as $\frac{2}{1}$ , fullfilling our above defintion of a rational number.

Which of the following is an irrational number?

$\pi$

$\frac{5}{3}$

$\frac{1}{2}$

Explanation

An irrational number is a number that cannot be expressed as a ratio of integers and cannot be expressed as terminating or repeating decimals.

Therefore, the only answer that follows this definition is $\pi$ .

Which of the following expressions is irrational?

$\small \sqrt{48}$

$\small \sqrt{64}$

$\small 4.5785$

$\small \small \frac{1}{3}$

Explanation

An irrational number is defined as any number that cannot be expressed as a simple fraction or does not have terminating or repeating decimals. Of the answer choices given, the only number that cannot be expressed as a simple fraction or with repeating or terminating decimals is $\small \sqrt{48}$ .

Irrational Numbers

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