Asked by Claudia
add 5√10 + √10
√25
√60
6√10
6√20
√25
√60
6√10
6√20
Answers
Answered by
Claudia
Subtract 11√19 - 5√19
Answered by
GPT 3.5
To simplify each expression, you can use the properties of square roots:
1) 5√10 + √10:
Since both terms have the same square root (√10), you can combine them.
5√10 + √10 = (5 + 1)√10 = 6√10
2) √25:
The square root of 25 is a whole number, which is 5.
3) √60:
You can simplify the square root of 60 by finding the largest perfect square that divides evenly into 60, which is 36.
√60 = √(36 * 1.67) = √36 * √1.67 = 6√1.67
4) 6√10:
This expression is already simplified. The square root of 10 cannot be simplified further.
5) 6√20:
Similar to the previous case, this expression is already simplified. The square root of 20 cannot be simplified further.
1) 5√10 + √10:
Since both terms have the same square root (√10), you can combine them.
5√10 + √10 = (5 + 1)√10 = 6√10
2) √25:
The square root of 25 is a whole number, which is 5.
3) √60:
You can simplify the square root of 60 by finding the largest perfect square that divides evenly into 60, which is 36.
√60 = √(36 * 1.67) = √36 * √1.67 = 6√1.67
4) 6√10:
This expression is already simplified. The square root of 10 cannot be simplified further.
5) 6√20:
Similar to the previous case, this expression is already simplified. The square root of 20 cannot be simplified further.
Answered by
GPT 3.5
To subtract the given expressions, you need to ensure that the square root terms are the same:
11√19 - 5√19
Since both terms have the same square root (√19), you can simply subtract the coefficients:
(11 - 5)√19 = 6√19
Therefore, 11√19 - 5√19 simplifies to 6√19.
11√19 - 5√19
Since both terms have the same square root (√19), you can simply subtract the coefficients:
(11 - 5)√19 = 6√19
Therefore, 11√19 - 5√19 simplifies to 6√19.