Statement II:
The integral part of (7+43)25 is an odd number.
In the light of the above statements, choose the correct answer:
A
Statement I is false but Statement II is true
B
Statement I is true but Statement II is false
C
Both Statement I and Statement II are false
D
Both Statement I and Statement II are true
Answer
Correct answer:D
Step-by-step solution
Standard Method
Given: Two statements are to be checked.
Statement I: 2513+2013+3113 is divisible by 7
Statement II: the integral part of (7+43)25 is odd
Find: Which option correctly describes the truth values of the two statements.
For Statement I, work modulo 7.
25≡4,20≡6,31≡3(mod7)
Using Fermat's theorem,
a6≡1(mod7)
so
a13=a12a=(a6)2a≡a(mod7)
Hence,
2513+2013+3113≡4+6+3=13≡0(mod7)
Therefore, Statement I is true.
For Statement II, use the conjugate.
(7+43)(7−43)=49−48=1
Hence,
(7+43)25+(7−43)25∈Z
Also,
0<7−43<1
so
(7−43)25∈(0,1)
Thus, the integral part of (7+43)25 is
(7+43)25+(7−43)25−1
and this is odd.
Therefore, Statement II is true.
So, both Statement I and Statement II are true. The correct option is D.
Conjugate Observation
Given: The expression (7+43)25 appears in Statement II.
Find: A quick way to decide whether its integral part is odd.
Observe that 7+43 and 7−43 are conjugates and
(7+43)(7−43)=1
Therefore,
(7+43)25+(7−43)25
is an integer. Since 0<7−43<1, its 25th power lies between 0 and 1. So subtracting that small positive quantity from the integer shows that the floor of (7+43)25 is exactly one less than that integer, hence odd.
This shortcut works because the conjugate term is positive but less than 1, so it determines the floor immediately without expanding any power.
Common mistakes
Reducing 25,20,31 modulo 7 correctly but then mishandling the exponent. Since Fermat's theorem gives a6≡1(mod7) for numbers coprime to 7, one must use a13=a12a=(a6)2a≡a, not a13≡1.
Assuming that because (7+43)25+(7−43)25 is an integer, the first term itself must be an integer. This is wrong because the irrational parts cancel only in the sum. Use the fact that 0<(7−43)25<1 to determine the integral part.
Missing the inequality 0<7−43<1. If this is not established, the floor argument is incomplete. First show the conjugate is positive and less than 1, then raise it to the 25th power.
Practice more Complex Numbers Basics questions
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.