Square Roots and Cube Roots
Square Roots and Cube Roots
Squaring a number and taking the square root are opposite operations. The same is true for cubing a number and finding its cube root. Understanding these concepts is essential for solving algebra and geometry problems.
What is a Square Root?
The square root of a number a is the nonnegative value x that satisfies the equation x2=a. The symbol for a square root is โ.
For example, 64โ=8 because 82=64.
To quickly solve problems, you should memorize the perfect squares up to 225:
- 12=1โน1โ=1
- 22=4โน4โ=2
- 32=9โน9โ=3
- 42=16โน16โ=4
- 52=25โน25โ=5
- 62=36โน36โ=6
- 72=49โน49โ=7
- 82=64โน64โ=8
- 92=81โน81โ=9
- 102=100โน100โ=10
- 112=121โน121โ=11
- 122=144โน144โ=12
- 132=169โน169โ=13
- 142=196โน196โ=14
- 152=225โน225โ=15
What is a Cube Root?
The cube root of a number a is the value x that satisfies the equation x3=a. The symbol for a cube root is 3โ.
Unlike square roots, cube roots can be negative! This is because a negative number multiplied by itself three times remains negative.
- Positive example: 327โ=3 because 3ร3ร3=27.
- Negative example: 3โ8โ=โ2 because (โ2)ร(โ2)ร(โ2)=โ8.
Here are the perfect cubes up to 1000 you should know:
- 13=1โน31โ=1
- 23=8โน38โ=2
- 33=27โน327โ=3
- 43=64โน364โ=4
- 53=125โน3125โ=5
- 63=216โน3216โ=6
- 73=343โน3343โ=7
- 83=512โน3512โ=8
- 93=729โน3729โ=9
- 103=1000โน31000โ=10
Estimating Roots of Non-Perfect Squares
Not all numbers are perfect squares. When you need to find the square root of a number like 50, you can estimate it by looking at the perfect squares around it.
Example: Estimate 50โ to one decimal place.
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Find the nearest perfect squares: We know that 49 and 64 are the closest perfect squares to 50. Since 49<50<64, it means that 49โ<50โ<64โ. Therefore, 7<50โ<8.
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Determine the decimal: The number 50 is much closer to 49 than it is to 64. So, the decimal will be very close to 7.0. Let's test 7.1.
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Test your estimate: 7.1ร7.1=50.41 Since 50.41 is incredibly close to 50, we can confidently estimate that 50โโ7.1.