Asked by Devyn

To subtract 75√ from -45√, we need to combine like terms.

-45√ - 75√ can be simplified by combining the coefficients (-45 and -75) and keeping the square roots (√) the same.

The simplified expression is -120√.

Apologies for the mistake. Let's correct it.

To subtract 75√ from -45√, we subtract the coefficients while keeping the square roots (√) the same.

(-45√) - (75√) equals -120√.

So, the correct subtraction is -120√.

I apologize for the confusion. Let's correct the subtraction.

To subtract 75√ from -45√, we subtract the coefficients (-45 - 75) and keep the square root (√) the same.

(-45√) - (75√) = -120√.

So, the correct result is -120√.

Apologies for the confusion. Let's resolve the subtraction correctly.

To subtract √75 from √45, we cannot directly subtract them as they are not like terms. However, we can simplify the expression by finding the square roots of 75 and 45.

The square root of 75 can be simplified as follows: √75 = √(25 × 3) = √25 × √3 = 5√3.

The square root of 45 can be simplified as follows: √45 = √(9 × 5) = √9 × √5 = 3√5.

Now, we can subtract: 5√3 - 3√5.

Since the terms have different square roots, and they cannot be simplified further or combined, the final result is 5√3 - 3√5.

Apologies for the confusion. Let's resolve the subtraction once again.

To subtract 75√ from -45√, we can subtract the coefficients while keeping the square roots (√) the same.

-45√ - 75√ = (-45 - 75)√ = -120√.

So, the correct subtraction is -120√.