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Answer
La expresión simplifica a \(63\sqrt[3]{10}\) o aproximadamente 135.729385.
Solution
Calculate or simplify the expression \( 23\sqrt[3]{10}-(-40\sqrt[3]{10}) \).
Calculate the value by following steps:
- step0: Calculate:
\(23\sqrt[3]{10}-\left(-40\sqrt[3]{10}\right)\)
- step1: Remove the parentheses:
\(23\sqrt[3]{10}+40\sqrt[3]{10}\)
- step2: Collect like terms:
\(\left(23+40\right)\sqrt[3]{10}\)
- step3: Add the numbers:
\(63\sqrt[3]{10}\)
La expresión \(23 \sqrt[3]{10}-(-40 \sqrt[3]{10})\) se simplifica a \(63\sqrt[3]{10}\) o aproximadamente 135.729385.
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Simplify this solution Bonus Knowledge
To solve the expression \( 23 \sqrt[3]{10} - (-40 \sqrt[3]{10}) \), you can simplify it by first eliminating the negative sign in front of the second term. This gives you: \[ 23 \sqrt[3]{10} + 40 \sqrt[3]{10} \] Now, combine the like terms: \[ (23 + 40) \sqrt[3]{10} = 63 \sqrt[3]{10} \] So, the final result is \( 63 \sqrt[3]{10} \).
