2006-09-26 16:37:57 · 13 answers · asked by nsgp12 1 in Science & Mathematics ➔ Mathematics
if you know a software, oracle in the computer then open it write "select power (4984209207,5) from dual;" by using username as scott and password tiger you will get answer as"3.076E+53" .
if not having oracle than go to visual basic in you computer open it tale the text box and command button on the form. double click on the command button type "a=text1.text
print a^5" run it. write the value in the text box click on command button it will give you answer as"3.07596447550268E+48 .
if not having any of these two then use a paper, your pen ,hand and mind and start calculating from right now.
by the way what is the question for which you are wanting this answer ?
good bye.
2006-09-27 17:18:17 · answer #1 · answered by nats 1 · 0⤊ 0⤋
i'm going to assume you already be attentive to that the respond is an integer. Your extensive type has 10 digits, and you be attentive to that one hundred to the 5th means could have 10 zeros and for this reason 11 digits. that provides you an bigger estimate on the extensive type you're searching for for. on the different hand the extensive type you have is very close to to being 11 digit so which you anticipate to work out an outstanding decision close to to one hundred fairly than, say 50. Now the subsequent clue comes from the final digit that's a unusual extensive type. So its 5th root won't be able to be even. That leaves a million,3,5,7,9 with the aid of fact the only opportunities for the final digit of its 5th root. even though it is likewise elementary to rule out a million and 5 suitable away as any means of an outstanding decision ending in those will lead to a million or 5 back. Now this reduces your seek to the numbers that have their final digits equivalent to 3, 7 and 9. Now making use of modular arithmetic examine that 5th means of an outstanding decision which lead to 3 would be 3, which lead to 7 would be 7 and which lead to 9 would be 9. So indexed right here are your opportunities: ninety seven, 87, seventy seven,... Now that is an argument of attempting a pair of numbers to work out that the respond could be 87.
2016-10-18 01:19:57 · answer #2 · answered by finkenbiner 4 · 0⤊ 0⤋
I think you asked the question backwards and really want to find the 5th root of that number.
Here's a hint: any whole number raised to the 5th power has the same ending digit. In this case, the last digit is 7, so try 7, 17, 27, etc. on your calculator until you find the number.
In this case, the number you want is 87.
2006-09-26 16:58:53 · answer #3 · answered by Anonymous · 1⤊ 0⤋
Multiply the number by itself to get the square. Multiply THAT by itself to get the fourth power of the original. Multiply the fourth power by the original number to get the fifth power. And what in the devil will you do with this 49-digit mess when you are done?
2006-09-26 16:44:12 · answer #4 · answered by Anonymous · 0⤊ 0⤋
Multiply it out 5 times..
If doing it by hand it will take awhile, but its straightforward.
Alternatively, write a simple computer program to implement the same algorithm that basic multiplication of two numbers follows.
As an approximation, you could take the log of the number, multiply it by 5 and then take the inverse log.
2006-09-26 16:42:14 · answer #5 · answered by Guru 6 · 0⤊ 0⤋
to get 4984209207 ^ 5
You can simply use ur calculator in windows
View scientific mode
and type the number 4984209207
then selct [ x^y] button
then type number 5
then click [ = ] button
u get the answer
3.0759644755026764479868959934839E+48
≈ 3.08 * 10^48
2006-09-26 16:59:47 · answer #6 · answered by M. Abuhelwa 5 · 0⤊ 0⤋
3.0759644755026764479868959934839e+48 is the aprprox value'
you can calculate the value by multiplying
2006-09-26 18:43:26 · answer #7 · answered by Vatsal S 2 · 0⤊ 0⤋
If you are able to program, write a program that will allow for a number as large as 50 digits to be displayed in its entirety. Or, find a friend who knows even basic programming (I'd do it, but I haven't programmed in a year.)
If it is any help, here are the first several digits: 617,141,927,185,296,000,000,000,000,000,000,000,000
2006-09-26 16:54:25 · answer #8 · answered by neogeoloco@sbcglobal.net 2 · 0⤊ 0⤋
multiply 4984209207 by itself 5 times
2006-09-26 20:20:47 · answer #9 · answered by bingo! 2 · 0⤊ 0⤋
multiply 4984209207 by itself 5 times
2006-09-26 16:42:31 · answer #10 · answered by semicharmed life girl 1 · 0⤊ 0⤋