Solve (sqrt x-10)*(sqrt x - 10)

Question

Simplify the expression

x - 20 x + 100

Evaluate

(x - 10) (x - 10)

Use the the distributive property to expand the expression

x \times x + x \times (- 10) - 10 x - 10 (- 10)

When a square root of an expression is multiplied by itself,the result is that expression

x + x \times (- 10) - 10 x - 10 (- 10)

Calculate the product

x - 10 x - 10 x - 10 (- 10)

Multiply the numbers

More Steps

Evaluate

- 10 (- 10)

Multiplying or dividing an even number of negative terms equals a positive

10 \times 10

Multiply the numbers

100

x - 10 x - 10 x + 100

Solution

More Steps

Evaluate

- 10 x - 10 x

Collect like terms by calculating the sum or difference of their coefficients

(- 10 - 10) x

Subtract the numbers

- 20 x

x - 20 x + 100

Show Solution

x = 100

Evaluate

(x - 10) (x - 10)

To find the roots of the expression,set the expression equal to 0

(x - 10) (x - 10) = 0

Find the domain

(x - 10) (x - 10) = 0, x \geq 0

Calculate

(x - 10) (x - 10) = 0

Calculate

(x - 10)^{2} = 0

The only way a power can be 0 is when the base equals 0

x - 10 = 0

Move the constant to the right-hand side and change its sign

x = 0 + 10

Removing 0 doesn't change the value,so remove it from the expression

x = 10

Raise both sides of the equation to the 2 -th power to eliminate the isolated 2 -th root

(x)^{2} = 1 0^{2}

Evaluate the power

x = 100

Check if the solution is in the defined range

x = 100, x \geq 0

Solution

x = 100

Show Solution