Last visit was: 23 Dec 2024, 02:53 It is currently 23 Dec 2024, 02:53

Close

GRE Prep Club Daily Prep

Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.

Customized
for You

we will pick new questions that match your level based on your Timer History

Track
Your Progress

every week, we’ll send you an estimated GRE score based on your performance

Practice
Pays

we will pick new questions that match your level based on your Timer History

Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.

Close

Request Expert Reply

Confirm Cancel
avatar
Intern
Intern
Joined: 18 May 2017
Posts: 5
Own Kudos [?]: 6 [0]
Given Kudos: 0
Send PM
User avatar
Retired Moderator
Joined: 07 Jun 2014
Posts: 4815
Own Kudos [?]: 11273 [0]
Given Kudos: 0
GRE 1: Q167 V156
WE:Business Development (Energy and Utilities)
Send PM
avatar
Intern
Intern
Joined: 31 May 2017
Posts: 1
Own Kudos [?]: 0 [0]
Given Kudos: 0
Send PM
Moderator
Moderator
Joined: 02 Jan 2020
Status:GRE Quant Tutor
Posts: 1115
Own Kudos [?]: 974 [0]
Given Kudos: 9
Location: India
Concentration: General Management
Schools: XLRI Jamshedpur, India - Class of 2014
GMAT 1: 700 Q51 V31
GPA: 2.8
WE:Engineering (Computer Software)
Send PM
Re: What is the remainder when 13^17 + 17^13 is divided by 10? [#permalink]
We need to find what is the remainder when \(13^{17} + 17^{13}\) is divided by 10

Theory: Remainder of sum of two numbers = Sum of their individual remainders
Remainder of any number by 10 = Unit's digit of that number


=> Remainder of \(13^{17} + 17^{13}\) by 10 = Remainder of \(13^{17}\) by 10 + Remainder of \(17^{13}\) by 10

Unit's digit of \(13^{17}\)

= Unit's digit of \(3^{17}\)

We can do this by finding the pattern / cycle of unit's digit of power of 3 and then generalizing it.

Unit's digit of \(3^1\) = 3
Unit's digit of \(3^2\) = 9
Unit's digit of \(3^3\) = 7
Unit's digit of \(3^4\) = 1
Unit's digit of \(3^5\) = 3

So, unit's digit of power of 3 repeats after every \(4^{th}\) number.
=> We need to divided 17 by 4 and check what is the remainder
=> 17 divided by 4 gives 1 remainder

=> \(3^{17}\) will have the same unit's digit as \(3^1\) = 3
=> Unit's digits of \(13^{17}\) = 3

Unit's digit of \(17^{13}\)

= Unit's digit of \(7^{13}\)

We can do this by finding the pattern / cycle of unit's digit of power of 7 and then generalizing it.

Unit's digit of \(7^1\) = 7
Unit's digit of \(7^2\) = 9
Unit's digit of \(7^3\) = 3
Unit's digit of \(7^4\) = 1
Unit's digit of \(7^5\) = 7

So, unit's digit of power of 7 repeats after every \(4^{th}\) number.
=> We need to divided 13 by 4 and check what is the remainder
=> 13 divided by 4 gives 1 remainder

=> \(7^{13}\) will have the same unit's digit as \(7^1\) = 7
=> Unit's digits of \(17^{13}\) = 7

=> Unit's digits of \(13^{17}\) + Unit's digits of \(17^{13}\) = 3 + 7 = 10

But remainder of \(13^{17} + 17^{13}\) by 10 cannot be more than or equal to 10
=> Remainder = Remainder of 10 by 10 = 0

So, Answer will be 0
Hope it helps!

Watch the following video to learn the Basics of Remainders

Prep Club for GRE Bot
Re: What is the remainder when 13^17 + 17^13 is divided by 10? [#permalink]
Moderators:
GRE Instructor
88 posts
GRE Forum Moderator
37 posts
Moderator
1115 posts
GRE Instructor
234 posts

Powered by phpBB © phpBB Group | Emoji artwork provided by EmojiOne