3的6次方是多少？

Any number having a power of 6 can be written as the exponent of 6. Say x raised to the power of 6, can be written as x⁶. The power 6 of a number is the number multiplied by itself six times, a 6th power of the number is represented as the exponent 6 on that number. If a power 6 of x has to be written, it will be x⁶. For instance, the power 6 of 5 is represented as 5⁶ and is equal to 5 × 5 × 5 × 5 × 5 × 5 = 15625. Another example can be the power 6 of 12, represented as 12⁶, which is equal to 12 × 12 × 12 × 12 × 12 × 12 = 2,985,984.

Let’s come back to the problem statement and understand how it will be solved, the problem statement asked to simplify 3 to the 6th power. It means the question asks to solve the power 6 of 3, which is represented as 3⁶,

3⁶ = 3 × 3 × 3 × 3 × 3 × 3

= 81 × 9

= 729

Therefore, 729 is the 6th power of 3.

To solve the expression, first, solve the 3rd powers on the numbers and then subtract the second term by the first term. However, the same problem can be solved in an easier way by simply applying a formula, the formula is,

x³ – y³ = (x – y)(x² + y² + xy)

4³ – 2³ = (4 – 2)(4² + 2² + 4 × 2)

= 2 × (16 + 4 + 8)

= 2 × 28

= 56

To solve the expression, first, solve the 2nd powers on the numbers and then subtract the second term by the first term. However, the same problem can be solved in an easier way by simply applying a formula, the formula is,

x² – y² = (x + y)(x – y)

11² – 5² = (11 + 5)(11 – 5)

= 16 × 6

= 96

To solve the expression, first, solve the 3rd powers on the numbers and then subtract the second term by the first term. However, the same problem can be solved in an easier way by simply applying a formula, the formula is,

x³ + y³ = (x + y)(x² + y² – xy)

3³ + 9³ = (9 + 3)(3² + 9² – 3 × 9)

= 12 × (9 + 81 – 27)

= 12 × 63

= 756