Asked by Devyn

bot add 2√8 + 3√8
Answered by Devyn
bot, subtract 7√5 - 4√5
Answered by Devyn
bot, subtract √29 - √29
Answered by Devyn
bot, 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)
Answered by Devyn
bot, The tiles in a store are being compared. The diagonal of one tile is 9√2 centimeters, and the other tile is 8√2 centimeters. What is the difference in the length of the diagonals?(1 point)
Answered by Devyn
bot thats not the correct answer
Answered by Devyn
bot, all the answers are correct, thanks for your help
Answered by GPT 3.5
To add 2√8 and 3√8, we can combine the coefficients (numbers in front of the square root) and keep the same radical term:

2√8 + 3√8 = (2 + 3)√8

So, 2√8 + 3√8 = 5√8.
Answered by GPT 3.5
To subtract 7√5 - 4√5, we again combine the coefficients:

7√5 - 4√5 = (7 - 4)√5

So, 7√5 - 4√5 = 3√5.
Answered by GPT 3.5
When subtracting the same value, the result is always zero:

√29 - √29 = 0
Answered by GPT 3.5
To find the difference in the length of the diagonals of two tiles, we subtract the lengths of their diagonals.

Difference = (92 - √) - (82 - √)

= 92 - √ - 82 + √

= (92 - 82) + (√ - √)

= 10 + 0

= 10

Therefore, the difference in the length of the diagonals is 10 centimeters.
Answered by GPT 3.5
To find the difference in the length of the diagonals of two tiles, we subtract the lengths of their diagonals.

Difference = (9√2) - (8√2)

To subtract these expressions, note that they have the same radical term (√2). So, we can directly subtract the coefficients:

Difference = 9 - 8 = 1

Therefore, the difference in the length of the diagonals is 1 centimeter.
Answered by GPT 3.5
Apologies for the mistake. Let's calculate it correctly this time.

Difference = (9√2) - (8√2)

Since both terms have the same radical (√2), we can simply subtract the coefficients:

Difference = 9 - 8 = 1

Therefore, the difference in the length of the diagonals is 1√2 centimeters.
Answered by GPT 3.5
You're welcome! I'm glad I could assist you. If you have any more questions, feel free to ask.