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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
25%
(medium)
Question Stats:
73% (01:08) correct
27%
(01:16)
wrong
based on 676
sessions
History
Date
Time
Result
Not Attempted Yet
What is the units digit of \((71)^{5}*(46)^{3}*(103)^{4} + (57)*(1088)^{3}\) ?
A. 0
B. 1
C. 2
D. 3
E. 4
A. 0
B. 1
C. 2
D. 3
E. 4
25 Jan 2017, 03:31
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Here we go....
Thumb Rule - Always pick the digit at the Unit place for such questions...
let's go step by step
(71)^5 ------> 1^5 ----- always result in a number that has 1 at it's unit place ---------- (1)
(46)^3 -------> 6^3 ------ like 1, 6 always result in a number that has 6 at it's unit place ---------- (2)
Check yourself 6*6 = 36*6 => 216*6 => 1296 and so on
(103)^4 -------> 3^4
Here is the pattern in case of 3 that should be considered
3 = 3
3*3 = 9 (3^2)
3*3*3 = 2(7) (3^3)
3*3*3*3 = 8(1) (3^4)
3*3*3*3*3 = last digit 3
so pattern order in case of number 3 is 4
back to our number in the question ---> (103)^4 => 3^4 => last digit would be 1 ---------------- (3)
From equations 1, 2, and 3
1*6*1 would result in 6
so from (71)^5∗(46)^3∗(103)^4 results in a number that has a last digit of 6 ------------------(a)
Apply the above principle to (57)∗(1088)^3
8 = 8
8*8 = 6(4)
8*8*8 = last digit would be (2)
the last digit of the product of (57)∗(1088)^3 ===> 7*2 => 14 => 4 (we are interested in the unit place) ----------(b)
Combine a and b
6 + 4 would result in 0 at the unit place....
Hence option A is correct
Consider Kudos for the post if it helped.
Thumb Rule - Always pick the digit at the Unit place for such questions...
let's go step by step
(71)^5 ------> 1^5 ----- always result in a number that has 1 at it's unit place ---------- (1)
(46)^3 -------> 6^3 ------ like 1, 6 always result in a number that has 6 at it's unit place ---------- (2)
Check yourself 6*6 = 36*6 => 216*6 => 1296 and so on
(103)^4 -------> 3^4
Here is the pattern in case of 3 that should be considered
3 = 3
3*3 = 9 (3^2)
3*3*3 = 2(7) (3^3)
3*3*3*3 = 8(1) (3^4)
3*3*3*3*3 = last digit 3
so pattern order in case of number 3 is 4
back to our number in the question ---> (103)^4 => 3^4 => last digit would be 1 ---------------- (3)
From equations 1, 2, and 3
1*6*1 would result in 6
so from (71)^5∗(46)^3∗(103)^4 results in a number that has a last digit of 6 ------------------(a)
Apply the above principle to (57)∗(1088)^3
8 = 8
8*8 = 6(4)
8*8*8 = last digit would be (2)
the last digit of the product of (57)∗(1088)^3 ===> 7*2 => 14 => 4 (we are interested in the unit place) ----------(b)
Combine a and b
6 + 4 would result in 0 at the unit place....
Hence option A is correct
Consider Kudos for the post if it helped.
General Discussion
