simplify (64)^1/3 , (25)^1/2
Answers
hey mate hope it helps you.
64 ^⅓ = 4
25^ ½ = 5
Answer:
(64)^(1/3) simplifies to 4, and (25)^(1/2) simplifies to 5.
Explanation:
To simplify (64)^(1/3), we need to find the cube root of 64. We can do this by trying to find a number that, when cubed, gives us 64. One way to approach this is to list out the cube of numbers until we find one that is close to 64. We can see that 4^3 = 64, so the cube root of 64 is 4. Therefore, (64)^(1/3) simplifies to 4.
To simplify (25)^(1/2), we need to find the square root of 25. We can do this by trying to find a number that, when squared, gives us 25. We can see that 5^2 = 25, so the square root of 25 is 5. Therefore, (25)^(1/2) simplifies to 5.
I hope this helps! Let me know if you have any further questions.
To simplify the expressions (64)^(1/3) and (25)^(1/2), we use the rules of exponents.
(64)^(1/3) can be written as the cube root of 64:
(64)^(1/3) = ∛(64) = 4
(25)^(1/2) can be written as the square root of 25:
(25)^(1/2) = √(25) = 5
Therefore, (64)^(1/3) simplifies to 4, and (25)^(1/2) simplifies to 5.
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