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WHAT IS 1/3 TO THE TENTH POWER IN FRACTION FORM?

AND WHAT IS (1/3)^10 x 9^4[tex](( \frac{1}{3}) ^{10}) 9^4[/tex]

1/3 to the tenth power times 9 to the 4th power

Sagot :

MathG33k
1/3 ^ 10 = 1/3 * itself ten times.
1/59049 x 9 ^ 4
1/59049 x 6561 = 6561/59049
1/9
TacoGod
Well, 1/3 to the 10th power. Since the numerator is 1, just ignore that.

Find the tenth power of 3.
3 x 3 x 3 x 3 x 3 x 3 x 3 x 3 x 3 x 3 = 59049
So, 1/3 to the 10th power is equal to 1/59049.
[tex] \frac{1}{3} ^{10} = \frac{1}{59049}[/tex]

Okay, for the second equation we know that 1/3 to the tenth power is already 1/59049.

Now find the 4th power for 9.

9 x 9 x 9 x 9 = 6561
[tex]9*9*9*9=6561[/tex]

Convert 6561 into a fraction, which is 6561/1.


Now multiply.

1/59049 x 6561/1 = 6561/59049

That fraction reduces into 1/9.

Answer #1: 1/59049
Answer #2: 1/9
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