To find the difference between two numbers given their LCM, HCF, and sum, we can use the relationship between these values.
Let the two numbers be a and b. We know from the problem that:
- LCM(a, b) = 495
- HCF(a, b) = 5
- a + b = 100
We also know the relationship between LCM and HCF:
LCM(a, b) × HCF(a, b) = a × b
Substituting the values we have:
495 × 5 = a × b
a × b = 2475
Now we have two equations:
- 1) a + b = 100
- 2) a × b = 2475
Let’s express b in terms of a from the first equation:
b = 100 – a
Now substitute this into the second equation:
a × (100 – a) = 2475
Expanding this, we get:
100a – a2 = 2475
Rearranging gives us a quadratic equation:
a2 – 100a + 2475 = 0
We can solve this using the quadratic formula:
a = [100 ± √(1002 – 4 × 1 × 2475)] / (2 × 1)
a = [100 ± √(10000 – 9900)] / 2
a = [100 ± √100] / 2
a = [100 ± 10] / 2
Calculating the possible values for a:
a = (110) / 2 = 55
a = (90) / 2 = 45
So the two possible pairs are:
- If a = 55, then b = 100 – 55 = 45
- If a = 45, then b = 100 – 45 = 55
Now, we can find the difference:
Difference = |a – b| = |55 – 45| = 10
Thus, the difference between the two numbers is 10.