## What is the units digit of 367?

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### What is the units digit of 367?

by [email protected] Revolution » Sat May 21, 2016 4:40 pm
What is the units digit of 3^67?
A. 1
B. 3
C. 5
D. 7
E. 9

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[Course] Starting $79 for on-demand and$60 for tutoring per hour and $390 only for Live Online. Email to : [email protected] Newbie | Next Rank: 10 Posts Posts: 2 Joined: 23 May 2016 by Simon Nguyen » Mon May 23, 2016 2:30 am The unit digits of 3-base powers follow this sequence: 3, 9, 7, 1 Indeed: 3^1 = 3 => unit digit is 3 3^2 = 9 => unit digit is 9 3^3 = 27 => unit digit is 7 3^4 = 81 => unit digit is 1 3^5 = 243 => unit digit is 3 If 3 is raised to 67th power, the unit digit numbers will repeat this sequence until it stops at 67th power. Because the remainder of the division of 67 by 4 is 3 (16*4 + 3 =67), the digit number of the 67th power will be the third number in the sequence. So the answer is 7 Elite Legendary Member Posts: 3991 Joined: 24 Jul 2015 Location: Las Vegas, USA Thanked: 19 times Followed by:36 members by [email protected] Revolution » Mon May 23, 2016 7:37 pm We get (~3)^1=~3, (~3)^2=~9, (~3)^3=~7, (~3)^4=~1. Units digit repeats 3ïƒ 9ïƒ 7ïƒ 1ïƒ 3. Then, 3^67=3^[4(16)+3]ïƒ 3^3=~7. Hence, the units digit becomes 7, and the correct answer is D. Math Revolution The World's Most "Complete" GMAT Math Course! Score an excellent Q49-51 just like 70% of our students. [Free] Full on-demand course (7 days) - 100 hours of video lessons, 490 lesson topics, and 2,000 questions. [Course] Starting$79 for on-demand and $60 for tutoring per hour and$390 only for Live Online.
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by jain2016 » Tue May 24, 2016 10:06 am
Hi Experts,

Can you please explain the below part?

3 (16*4 + 3 =67)

Thanks,

SJ

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by [email protected] » Tue May 24, 2016 11:31 am
jain2016 wrote:Hi Experts,

Can you please explain the below part?

3 (16*4 + 3 =67)

Thanks,

SJ
Think of it like this - the pattern for the unit's digit for base 3 goes as follows:

3^1 ---> 3
3^2 ---> 9
3^3 ---> 7
3^4 ---> 1

3^5 ---> 3
3^6 ---> 9
3^7 ---> 7
3^8 ---> 1

So the pattern repeats every four terms. Put another way, every time the exponent is a multiple of 4, the units digit is '1.' Now we can think of a multiple of 4 that's close to 67. (So think either 64, as the above example does, or 68. Let's use 68.)

3^65 ---> 3
3^66 ---> 9
3^67 ---> 7
3^68 ---> 1
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by jain2016 » Wed May 25, 2016 3:05 am
Hi David ,

Thanks,

SJ

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by danielle07 » Sun Sep 03, 2017 1:47 pm
This explanation is very good and easy to follow that i also got D as the answer

The unit digits of 3-base powers follow this sequence: 3, 9, 7, 1
Indeed:
3^1 = 3 => unit digit is 3
3^2 = 9 => unit digit is 9
3^3 = 27 => unit digit is 7
3^4 = 81 => unit digit is 1
3^5 = 243 => unit digit is 3

If 3 is raised to 67th power, the unit digit numbers will repeat this sequence until it stops at 67th power. Because the remainder of the division of 67 by 4 is 3 (16*4 + 3 =67), the digit number of the 67th power will be the third number in the sequence.

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### Re: What is the units digit of 367?

by [email protected] » Sat Feb 08, 2020 12:45 pm
[email protected] Revolution wrote:
Sat May 21, 2016 4:40 pm
What is the units digit of 3^67?
A. 1
B. 3
C. 5
D. 7
E. 9

*An answer will be posted in 2 days.
The pattern of units digits of the base of 3 is 3-9-7-1. Thus, 3^68 has a units digit of 1, so 3^67 has a units digit of 7.