Calculate 343 to the power of \frac{1}{3} and get 7.
Calculate 343 to the power of \frac{4}{3} and get 2401.
Thus, the simplifying value of the above expression is 6.
8 1/3 = 8 1/3 = 8 · 3 + 1/3 = 24 + 1/3 = 253 = 8 13 ≅ 8.3333333.
Answer: 1/3 to the power of 3 is represented as 1/27 as a fraction.
3 Answers. All you have to do is type in 3.14, then hit the xy and type in 1/3. Or you can type 1 ÷ 3 after typing 3.14 and hitting xy.
Answer and Explanation: 2.66666666667 expressed as a fraction is 266666666667 100 , 000 , 000 , 000 if we have a terminal decimal and if we have a repeating decimal that is rounded off at the end.
Answer: 1/3 to the power of 2 can be expressed as (1/3)2 = (1/3) × (1/3) = 1/9.
Answer: 1/3 to the power of 5 is (1/3)5 = 1/243.
Answer: 64 to the power of 1/3 is 4.
Hence, 343 is equal to \[{7^3}\] or we can write it as 7 raised to the power 3.
In statistics, the symbol e is a mathematical constant approximately equal to 2.71828183. Prism switches to scientific notation when the values are very large or very small. For example: 2.3e-5, means 2.3 times ten to the minus five power, or 0.000023.
1/3^2 = 19 ≅ 0.1111111
Spelled result in words is one ninth.
Expressed as a geometric series: 0.11111 ⋯ = 1 / 10 + 1 / 100 + 1 / 1000 + 1 / 10000 + ⋯ = ( 1 / 10 ) ( 1 + 1 / 10 + 1 / 100 + 1 / 1000 + … ) So we found the repeating decimal 0.11111 … equal to one-ninth.
0.66666666667 expressed as a fraction is 66666666667 100 , 000 , 000 , 000 if we have a terminating decimal and if we have a repeating decimal.
The fraction 9/28 as a decimal is equal to 0.3214285714.
Solution: 69.88 as a fraction is 1747/25.
Answer: 33⅓ in decimal form is 33.3333.
Let's look into the conversion of 33⅓ to decimals. Explanation: 33⅓ can be re-written as 33 + 1/3. So, it is good enough to find 1/3 as a decimal and add 33 to it.
Log table (logarithm table) is used in performing bigger calculations (of multiplication, division, squares, and roots) without using a calculator. The logarithm of a number to a given base is the exponent by which that base should be raised to give the original number.