# sqrt(108)

SOLUTION: simplify square root of 108

SOLUTION: simplify square root of 108. The goal of simplifying expressions with square roots is to factor the radicand into a product of two numbers. One of these two numbers must be a perfect square. This way the perfect square will become a rational number.

Mathway | Simplify square root of 108

Free math problem solver answers your algebra, geometry, trigonometry, calculus, and statistics homework questions with stepbystep explanations, just like a math tutor.

How do you simplify sqrt(108)? | Socratic

color(blue)(6sqrt3 sqrt(108) = sqrt(3*3*3*2*2) =sqrt(3^2*2^2*3) =6sqrt3.

Square Root Of 108 Simplified? – Math Question [SOLVED]

Simplified Square Root for v108 is 6v3; Step by step simplification process to get square roots radical form: First we will find all factors under the square root: 108 has the square factor of 36. Let’s check this width v36*3=v108. As you can see the radicals are not in their simplest form. Now extract and take out the square …

Simplify sqrt(108) sqrt(108) Tiger Algebra Solver

Tiger Simplifies Radicals {sqrt(108)} showing steps.

[SOLVED] What is the Square Root of {108} in simplest radical form

All the steps and work for how to simplify the square root {108} in simplest radical form.

Square Root of 108

The square root of 108 is the number, which multiplied by itself, is 108. In other words, the square of this number equals hundred and eight. If you have been looking for square root of hundred and eight then you are right here, too. On this page you can also find what its parts are called, and in addition to the terminology of …

Simplify square root of 108? | Yahoo Answers

First, let’s break the 2 numbers down to factors, 48=2x2x2x2x3 108=2x2x3x3x3 Whenever you have a pair of the same factor, you can take both of them of the the square root, and when then come out, only one left. For example, 2×2 inside will be 2 outside. so sr(48) = sr (2x2x2x2x3) 2 pairs of 2 comes out …

Show that x = 2 – Math Forum – Ask Dr. Math

The second thing I see is that the expressions inside the cube roots are very similar. It will help if we call the two cube roots a and b, in order to see more clearly what is happening: x = a + b a^3 = 10 + sqrt(108) b^3 = 10sqrt(108) Now I notice that the sum (or difference) of a^3 and b^3 has a simple form.