Find the cubic root 32. Note: You will find the option to add a cubic root symbol in the Algebra (× ) keyboard
The cubic root of 32 can be written as ∛32.
Wrong.
I apologize for the incorrect response. The correct cubic root of 32 can be written as ∛32 ≈ 3.174.
To find the cubic root of 32, you can use the cubic root symbol (∛).
The cubic root of 32 can be written as ∛32.
To calculate it, you can follow these steps:
Step 1: Start by finding the prime factorization of 32:
32 = 2 × 2 × 2 × 2 × 2 = 2^5
Step 2: Now, group the prime factors into groups of three. Since there is only one group of three, we can't simplify further.
∛32 = ∛(2^5)
Step 3: Simplify the expression by taking one factor from each group of three outside of the cubic root:
∛32 = ∛(2^3 × 2^2)
Step 4: Use the property of exponents that says a^n × b^n = (ab)^n:
∛32 = ∛((2 × 2)^3 × 2^2) = ∛(4^3 × 2^2)
Step 5: Simplify further by using the property of exponents again:
∛32 = ∛[(4 × 2)^3] = ∛(8^3)
Step 6: Finally, simplify the expression inside the cubic root:
∛32 = 8
Therefore, the cubic root of 32 is 8.
To find the cubic root of 32, you can follow these steps:
Step 1: Open an algebraic expression editor or a calculator that supports the cubic root function.
Step 2: Locate the cubic root symbol (∛) on the algebraic keyboard or calculator.
Step 3: Enter the number 32 inside the cubic root symbol (∛). It should look like this: ∛32.
Step 4: Press the "Enter" or "Calculate" button on the calculator or use the appropriate function key in the expression editor.
Step 5: The result will be the cubic root of 32, which is 2.
So, the cubic root of 32 is ∛32 = 2.