Steps 1 & 2: Understand Question and Draw Inferences
We are given that X = 6p + 7q+23, and we have to find the unit digit of X. The numbers p and q both are positive integers. Now, the unit digit of X will be the sum of the unit digits of 6p and 7q+23.
So, we have to find the unit digit of 6p and 7q+23.
Now, we know that the unit digit of 6 raised to any integer power is 6. So, the unit digit of 6p is 6.
And the cyclicity of 7 is 4 i.e. every 4th power of 7 has the same unit digit and cycles of power of 7 are 7, 9, 3, and 1.
So, the unit digit of the expression:
X = 6p + 7q+23 = (Unit Digit of 6p) + (Unit digit of 7q+23)
= 6 + (Unit digit of 7q+23)
So, the unit digit of 7q+23 will depend on the value of q. We have to find the value of q to determine the unit digit of X.
Step 3: Analyze Statement 1
Statement 1 says: q = 2p – 11
However, since we don’t know the value of p, we can’t determine the value of q.
Hence, statement I is not sufficient to answer the question: What is the unit digit of X?
Step 4: Analyze Statement 2
Statement 2 says:
q2 – 10q + 9 = 0
q2 – 9q -q + 9 = 0
(q – 9) (q – 1) = 0
Thus, q= 1, 9
Let’s consider both the values one by one:
- If q = 1
In this case, the expression 7q+23 becomes:
71+23 = 724
Since the cyclicity of 7 is 4 i.e. every 4th power of 7 has the same unit digit and cycles of power of 7 are 7, 9, 3, and 1.
And,
24 = 4*6
So, the unit digit of 724 = 1
2. If q = 9
In this case, the expression 7q+23 becomes:
79+23 = 732
Since the cyclicity of 7 is 4 i.e. every 4th power of 7 has the same unit digit and cycles of power of 7 are 7, 9, 3, and 1.
And,
32 = 4*8
So, the unit digit of 732 = 1
So, in both the cases we get the unit digit of 7q+23 as 1. As derived in the first step, the unit digit of X
= 6 + (Unit digit of 7q+23) = 6 + 1 = 7
So, statement (2) alone is sufficient to answer the question: What is the unit digit of X?
Step 5: Analyze Both Statements Together (if needed)
Since statement (2) alone is sufficient to answer the question, we don’t need to perform this step.
Answer: Option (B)