1024 = 45
Log1024 = Log45 = 5Log4
Any nonzero number raised to the zero power equals to 1."Note 1: a0 = 1 is a convention, that is, we agree that raising any number to the power 0 is 1. We cannot multiply a number by itself zero times.Note 2: In the case of zero raised to the power 0 (written 00), mathematicians have been debating this for hundreds of years. It is most commonly regarded as having value 1, but is not so in all places where it occurs. That's why we write a≠ 0." (from the website)
15
A base raised to a negative power is equal to 1 divided by that base raised to a positive exponent. So 16 raised to (-3/2) is equal to 1/ (16 raised 3/2), or 1/64.
It is: 7.0*10^-5
Three to the third power equals three times three times three equals twenty-seven. 3^3 = 3 x 3 x 3 = 27
You write it in superscore, such as b25 or B raised to the 25th power
100 can be written as 10 raised to the power of 2.
if y = x^a, then logxy = a
366 which equals 2,176,782,336
you suck penis then shuve it up your anuse
Any nonzero number raised to the zero power equals to 1."Note 1: a0 = 1 is a convention, that is, we agree that raising any number to the power 0 is 1. We cannot multiply a number by itself zero times.Note 2: In the case of zero raised to the power 0 (written 00), mathematicians have been debating this for hundreds of years. It is most commonly regarded as having value 1, but is not so in all places where it occurs. That's why we write a≠ 0." (from the website)
Write a program using recursion which should take two values and display 1st value raised to the power of second value.
2 to the second power, written 2 with a superscript, (raised half a line to the right of the numeral 2).
Any number to the zero power equals one.
Its hard to do type it out. Easier to write it. ^ means the number is raised or superscript. X = (2)^2 X (3)^3
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Why is 7^0 = 1 Algebraic proof. Let 'n' be any value Let 'n be raised to the power of 'a' Hence n^a Now if we divide n^a by n^a we have n^a/n^a and this cancels down to '1' Or we can write n^(a)/n^(a) = n^(a-a) = n^(0) , hence it equals '1' Remember when the lower /denominating index is a negative power ,when raised above the division line.