QUESTION IMAGE
Question
to estimate the cube root of a non - perfect cube.
cubes
estimate the cube roots by finding the perfect cubes that are less and greater than the number. find the cube roots of the perfect cubes for your estimate. then, circle the integer that the estimate is closest to. the first one is done for you.
| consecutive cubes | in between the integers | |
|---|---|---|
| $sqrt3{30}$ | ||
| $sqrt3{123}$ | ||
| $sqrt3{63}$ | ||
| $sqrt3{500}$ | ||
| $sqrt3{237}$ | ||
| $sqrt3{195}$ | ||
| $sqrt3{892}$ | ||
| $sqrt3{1400}$ | ||
| $sqrt3{23}$ | ||
| $sqrt3{317}$ |
Step1: Recall perfect - cube values
The perfect - cube values are \(1^3 = 1\), \(2^3=8\), \(3^3 = 27\), \(4^3=64\), \(5^3 = 125\), \(6^3=216\), \(7^3 = 343\), \(8^3=512\), \(9^3 = 729\), \(10^3=1000\), \(11^3 = 1331\), \(12^3=1728\).
Step2: Estimate \(\sqrt[3]{30}\)
Since \(3^3=27\) and \(4^3 = 64\), and \(27<30<64\), \(\sqrt[3]{30}\) is between \(3\) and \(4\), and closer to \(3\).
Step3: Estimate \(\sqrt[3]{123}\)
Since \(4^3 = 64\) and \(5^3=125\), and \(64<123<125\), \(\sqrt[3]{123}\) is between \(4\) and \(5\), and closer to \(5\).
Step4: Estimate \(\sqrt[3]{63}\)
Since \(4^3 = 64\) and \(3^3=27\), and \(27<63<64\), \(\sqrt[3]{63}\) is between \(3\) and \(4\), and closer to \(4\).
Step5: Estimate \(\sqrt[3]{500}\)
Since \(7^3 = 343\) and \(8^3=512\), and \(343<500<512\), \(\sqrt[3]{500}\) is between \(7\) and \(8\), and closer to \(8\).
Step6: Estimate \(\sqrt[3]{237}\)
Since \(6^3 = 216\) and \(7^3=343\), and \(216<237<343\), \(\sqrt[3]{237}\) is between \(6\) and \(7\), and closer to \(6\).
Step7: Estimate \(\sqrt[3]{195}\)
Since \(5^3 = 125\) and \(6^3=216\), and \(125<195<216\), \(\sqrt[3]{195}\) is between \(5\) and \(6\), and closer to \(6\).
Step8: Estimate \(\sqrt[3]{892}\)
Since \(9^3 = 729\) and \(10^3=1000\), and \(729<892<1000\), \(\sqrt[3]{892}\) is between \(9\) and \(10\), and closer to \(9\).
Step9: Estimate \(\sqrt[3]{1400}\)
Since \(11^3 = 1331\) and \(12^3=1728\), and \(1331<1400<1728\), \(\sqrt[3]{1400}\) is between \(11\) and \(12\), and closer to \(11\).
Step10: Estimate \(\sqrt[3]{23}\)
Since \(2^3 = 8\) and \(3^3=27\), and \(8<23<27\), \(\sqrt[3]{23}\) is between \(2\) and \(3\), and closer to \(3\).
Step11: Estimate \(\sqrt[3]{317}\)
Since \(6^3 = 216\) and \(7^3=343\), and \(216<317<343\), \(\sqrt[3]{317}\) is between \(6\) and \(7\), and closer to \(7\).
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
| \(\sqrt[3]{}\) | Consecutive Cubes | In Between the Integers |
|---|---|---|
| \(\sqrt[3]{123}\) | \(64\) and \(125\) | \(4\) and \(5\) (circle \(5\)) |
| \(\sqrt[3]{63}\) | \(27\) and \(64\) | \(3\) and \(4\) (circle \(4\)) |
| \(\sqrt[3]{500}\) | \(343\) and \(512\) | \(7\) and \(8\) (circle \(8\)) |
| \(\sqrt[3]{237}\) | \(216\) and \(343\) | \(6\) and \(7\) (circle \(6\)) |
| \(\sqrt[3]{195}\) | \(125\) and \(216\) | \(5\) and \(6\) (circle \(6\)) |
| \(\sqrt[3]{892}\) | \(729\) and \(1000\) | \(9\) and \(10\) (circle \(9\)) |
| \(\sqrt[3]{1400}\) | \(1331\) and \(1728\) | \(11\) and \(12\) (circle \(11\)) |
| \(\sqrt[3]{23}\) | \(8\) and \(27\) | \(2\) and \(3\) (circle \(3\)) |
| \(\sqrt[3]{317}\) | \(216\) and \(343\) | \(6\) and \(7\) (circle \(7\)) |