What is 7^2017
or 7 to the power of 2017
WILL MARK BRAINIEST IF CORRECT
Answers
Answered by
1
7^(2017) = infinite (∞)
And it's true, you can't find it in you calculator too.
Because it is very very very Big no.
You can find it's last digit, by seeing the trend.
(If you want me to find that, please comment)
Thankyou!!!
And it's true, you can't find it in you calculator too.
Because it is very very very Big no.
You can find it's last digit, by seeing the trend.
(If you want me to find that, please comment)
Thankyou!!!
Raja395:
7^(4n-3) = ___7 (last digit as 7)
where n is any integer greater than equals to 1. ( n≥1 ).
So, 7^(2017) = ?? First find 2017 in terms of (4n -....).
To do so, divide 2017 by 4, we get: 2017/4 = ((504) + 1)
Sorry, I missed 4 in last step Ignore last step, inserted consider this step: 2017/4 = (504×4 + 3) = (505×4 - 3)
Now we can say, n = 505 and 3 is the remainder, So, it's general formula is (4n - 3)
Therefore last digit of 7^(2017) = __7
last digit is 7
If you still have any doubt, you can ask
Thankyou!!!
Answered by
1
Step-by-step explanation:
he...its you can do ,if u have calculator .
please don't waist time other.
i hopes its helps u.
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oof not helpful
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