Number Theory - Algebra 2

For a number to be prime it must only have factors of one and itself.

10 has factors 1, 2, 5, 10.

15 has factors 1, 3, 5, 15.

18 has factors 1, 2, 3, 6, 9, 18.

The only factors of 13 are 1 and 13. As such it is prime.

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

can be written as .

is simply , which is a rational number.

The number can be rewritten as a fraction of whole numbers, , which makes it a rational number.

is also a rational number because it is a ratio of whole numbers.

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

Recall the following property of negative numbers:

It follows that:

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 . The term 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.

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 , and (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.

is the correct answer because , which can be expressed as , fullfilling our above defintion of a rational number.

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 is already expressed as a simple fraction.

any number and

. All of these options can be expressed as simple fractions, making them all rational numbers, and the incorrect answers.

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.

An irrational number is one that cannot be written as a fraction. All integers are rational numberes.

Repeating decimals are never irrational, can be eliminated because

.

and are perfect squares making them both integers.

Therefore, the only remaining answer is .

Recall the following property of negative numbers:

It follows that:

Irrational numbers are numbers that can't be expressed as a fracton. This elminates statement III automatically as it's a fraction.

Statement I's fraction is so this statement is false.

Statement IV. may not be easy to spot but if you let that decimal be and multiply that by you will get . This becomes . Subtract it from and you get an equation of .

becomes which is a fraction.

Statement II can't be expressed as a fraction which makes this the correct answer.

Irrational numbers can't be expressed as a fraction with integer values in the numerator and denominator of the fraction.

Irrational numbers don't have repeating decimals.

Because of that, there is no definite value of irrational numbers.

Therefore, is irrational because it can't be expressed as a fraction.

Let's take two irrationals like and multiply them. The answer is which is rational.

But what if we took the product of and . We would get which doesn't have a definite value and can't be expressed as a fraction.

This makes it irrational and therefore, the answer is sometimes irrational, sometimes rational.

Some answers can be solved. Let's look at some obvious irrational numbers.

is surely irrational as we can't get an exact value.

The same goes for and .

is not a perfect cube so that answer choice is wrong.

Although is a square root, the sum inside however, makes it a perfect square so that means is rational.

Distribute the negative

Combine like terms

Let's look at all the answer choices.

The area of a triangle is base times height divided by two. Since base and height can be any value, this statement is wrong. We can have irrational values or rational values, thus generating both irrational or rational answers.

The diagonal of a right triangle will generate sometimes rational answers or irrational values. If you have a perfect Pythagorean Triple or etc..., then the diagonal is a rational number. A Pythagorean Triple is having all the lengths of a right triangle being rational values. One way the right triangle creates an irrational value is when it's an isosceles right triangle. If both the legs of the triangle are , the hypotenuse is

, , , can't be negative since lengths of triangle aren't negative.

The same idea goes for volume of cube and area of square. It will generate both irrational and rational values.

The only answer is finding value of . is irrational and raised to any power except 0 is always irrational.

The definition of irrational numbers is that they are real numbers that cannot be expressed in a common ratio or fraction.

The term is imaginary which equals to .

The other answers can either be simplified or can be written in fractions.

The only possible answer shown is .

Since all the possible answers are square roots, we can square both the limits of our problem and all the possible answers. This allows us to see which number is correct. After squaring everything, we notice that we need a number between 81 and 100. The only possible answer given is 90. Now we can square root everything back, giving us our final answer of .

In order to rationalize, we will need to multiply the top and bottom by the denominator in order to eliminate the square root in the denominator.

Distribute and simplify the numerator. Multiplying unlike numbers inside square roots will not eliminate the square root!

The answer is:

Multiply Binomials ( you may use the FOIL method)

We know that , so we replace with

combine like terms

Distribute the i

We know that , so we replace with

Swich to standard form

Factor the number -96

-1 2 2 2 2 2 3

The -1 come out the radical as an i. We look for pairs in the factors.

-1 ( 2 2 )( 2 2 ) 2 3

We see two pairs of 2, both can come out from under the radical .

Multiply