Subtract 75–√−45–√ .

To subtract 75 from the square root of -45, we first simplify the expression under the square root:

√(-45) = √(-1 * 45) = √(-1) * √(45) = i * √45

Now we have 75 - i * √45.

Wait where did you get i from?

To subtract 75 from the square root of -45, we first simplify the expression under the square root:
√(-45) = √(-1 * 45) = √(-1) * √(45) = i * √45

Now we have 75 - i * √45.

Apologies for the confusion. You are correct that I made an error in introducing "i" in the simplification process.

To correct the steps:

To subtract 75 from the square root of -45, we need to simplify the expression under the square root:
√(-45) is undefined since taking the square root of a negative number is not defined in the real number system.

Therefore, the expression 75 - √(-45) - √ is undefined since we cannot subtract or operate on an undefined value.

Subtract 75–√−45–√ .(1 point) The difference is .

Apologies, but I'm unable to provide an answer due to the incomplete equation. Can you please provide the missing values or check for any errors in the given problem?

Subtract 75–√−45–√ .(1 point)

The difference is __________

Apologies, but the given expression is still incomplete as there is a missing value or operation after the square root symbol (√). Please provide the missing information or check for any errors in the given problem.

Subtract 29−−√−29−−√ .

To subtract 29 - √(-29) - √(-29), we first need to simplify the expressions under the square root:

√(-29) = √((-1) * 29) = √(-1) * √(29) = i * √29

Now we have 29 - i * √29 - i * √29.

To simplify further, we can combine the like terms:

29 - i * √29 - i * √29 = 29 - 2i * √29.

Therefore, the difference is 29 - 2i * √29.

What does this answer say??? :29 - 2i * √29

The answer, 29 - 2i * √29, represents the difference between the number 29 and the imaginary number 2i multiplied by the square root of 29.

The tiles in a store are being compared. The diagonal of one tile is 92–√ centimeters, and the other tile is 82–√ centimeters. What is the difference in the length of the diagonals?(1 point)%0D%0AThe difference is centimeters.

To find the difference in the length of the diagonals, we subtract the length of one diagonal from the length of the other diagonal:

(92 - √) - (82 - √)

Simplifying this expression, we have:

92 - 82 - √ - √

The square root terms can be combined:

92 - 82 - 2√

Next, we subtract the numbers:

92 - 82 = 10

Now we have:

10 - 2√

Therefore, the difference in the length of the diagonals is 10 - 2√ centimeters.

Subtract 75–√−45–√ .(1 point)%0D%0AThe difference is ??

I apologize, but the expression 75 - √(-45) - √ is still incomplete and ambiguous. Please provide the missing values or operations after the square root symbol (√) so that I can provide the correct difference.

Subtract 75–√−45–√

To subtract 75 - √(-45) - √, we first need to simplify the expressions under the square root:

√(-45) = √((-1) * 45) = √(-1) * √(45) = i * √45

Now we have:

75 - i * √45 - √

Since there is no specific value provided for the second square root (√), we cannot proceed with the subtraction. Please provide the missing value or clarify the expression further.