How many zeroes are there at the end of 34!^6!
Answer (1)
28th Feb, 2019
Hello Aspirant,
there will be 18 zeros in the result. You can easily caculate it as there are three three zeros in 34!. Using the mathematical identity of powers that is (x^a)^b = x^(a*b). It will make that three zeros to 3*6 = 18 zeros.
Hence, in the final result we will have total of 18 zeros. For this you do not have to calculate the 34! and then observe the result. A bit of common mathematics can do its trick.
Good Luck !!!
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