How to Solve: Units' Digit of Power of 7

Hi All,

I have posted a video on YouTube to discuss Units' Digit of Power of 7

[you-tube]https://www.youtube.com/watch?v=phDwwXPqHpo[/you-tube]

Attached pdf of this Article as SPOILER at the top! Happy learning!

Following is Covered in the Video

Theory of Units' Digit of Power of 7

⁍ Find Units’ digit of $7^{81}$ ?
⁍ Find Units’ digit of $7^{37}$ ?
⁍ Find Units’ digit of $7^{52}$ ?
⁍ Find Units’ digit of $7^{80a + 51}$ (given that a is a positive integer)?
⁍ Find Units’ digit of $1297^{2041}$ ?

Theory of Units' Digit of Power of 7

• To find units' digit of any positive integer power of 7

We need to find the cycle of units' digit of power of 7
$7^1$ units’ digit is 7 $7^2$ units’ digit is 9 $7^3$ units’ digit is 3 $7^4$ units’ digit is 1	$7^5$ units’ digit is 7 $7^6$ units’ digit is 9 $7^7$ units’ digit is 3 $7^8$ units’ digit is 1

=> The power repeats after every $4^{th}$ power
=> Cycle of units' digit of power of 7 = 4
=> We need to divide the power by 4 and check the remainder
=> Units' digit will be same as Units' digit of $7^{Remainder}$

NOTE: If Remainder is 0 then units' digit = units' digit of $7^{Cycle}$ = units' digit of $7^{4}$ = 1

Q1. Find Units’ digit of $7^{81}$?



Q2. Find Units’ digit of $7^{37}$?



Q3. Find Units’ digit of $7^{52}$?



Q4. Find Units’ digit of $7^{80a + 51 }$ (given that a is a positive integer)?



Q5. Find Units’ digit of $1297^{2041}$?



Master List of Units' Digit of Power of Numbers from 2 to 9





Hope it helps!