Aptitude - Problems on H.C.F and L.C.M - Discussion
Discussion Forum : Problems on H.C.F and L.C.M - General Questions (Q.No. 30)
30.
If the sum of two numbers is 55 and the H.C.F. and L.C.M. of these numbers are 5 and 120 respectively, then the sum of the reciprocals of the numbers is equal to:
Answer: Option
Explanation:
Let the numbers be a and b.
Then, a + b = 55 and ab = 5 x 120 = 600.
 The required sum = |
1 | + | 1 | = | a + b | = | 55 | = | 11 |
| a | b | ab | 600 | 120 |
Discussion:
37 comments Page 2 of 4.
Tom said:
1 decade ago
The sum of two numbers is 120 and their hcf is 12. Find the numbers?
Math_lover said:
1 decade ago
@Tom.
There are 2 answers for this:
12 and 108.
36 and 84.
There are 2 answers for this:
12 and 108.
36 and 84.
Viswajith said:
1 decade ago
The HCF of two numbers is 15. Find its LCM? Anyone please help with steps.
Jedi Knight Ani said:
1 decade ago
@Amol.
Reciprocal is calculated by dividing 1 by that number. Sum of the reciprocals = 1/a + 1/b.
Reciprocal is calculated by dividing 1 by that number. Sum of the reciprocals = 1/a + 1/b.
Narendra Pandey said:
1 decade ago
@Vishwajit.
As HCF and LCM is given.
Standard Formula:
Product of two number = HCF*LCM.
Suppose two number be x and y.
xy = 5*12.
x+y = 55.
Now x = 55-y put the value of x in xy = 600.
Now (55-y)y = 600.
y^2-55y+600 = 0.
By factorization we get.
y^2-40y-15y+600 = 0.
y(y-40)-15(y-40) = 0.
Now y=40 and 14.
As in question reciprocal of number 1/x+1/y.
1/40+1/15 = 55/600 = 11/120.
That's it.
As HCF and LCM is given.
Standard Formula:
Product of two number = HCF*LCM.
Suppose two number be x and y.
xy = 5*12.
x+y = 55.
Now x = 55-y put the value of x in xy = 600.
Now (55-y)y = 600.
y^2-55y+600 = 0.
By factorization we get.
y^2-40y-15y+600 = 0.
y(y-40)-15(y-40) = 0.
Now y=40 and 14.
As in question reciprocal of number 1/x+1/y.
1/40+1/15 = 55/600 = 11/120.
That's it.
Vighneshvinu said:
10 years ago
Dear @Kishan you will require options to find the answer for if HCF of two numbers is 98 and LCM of numbers is 2352 then what is the sum of these numbers?
From the options find a number which is divisible by 98. Which will be your required answer? Example 1372, 1398, 1426, 1484.
Out of these options a number which is exactly divisible by 98 is 1372.
So this will be your required answer (HCF is a common factor for both the numbers. So if x & y are the nos then the sum will be x+y = 98*(a+b). Here x = 98*a & y = 98*b).
Hope this was useful to you.
From the options find a number which is divisible by 98. Which will be your required answer? Example 1372, 1398, 1426, 1484.
Out of these options a number which is exactly divisible by 98 is 1372.
So this will be your required answer (HCF is a common factor for both the numbers. So if x & y are the nos then the sum will be x+y = 98*(a+b). Here x = 98*a & y = 98*b).
Hope this was useful to you.
Abhishek said:
10 years ago
Thanks it helped me a lot.
Kptel said:
9 years ago
If no's are 40 &15 what will be the sum of their reciprocals with the same condition?
And please tell me what would be the HCF if sum of their reciprocals is 11/120?
Please anyone answer this.
And please tell me what would be the HCF if sum of their reciprocals is 11/120?
Please anyone answer this.
Alay patel said:
9 years ago
If products of two numbers = products of HCF and LCM.
What if the sum of two numbers?
What if the sum of two numbers?
SURAJIT HALDER said:
9 years ago
If the sum of two numbers is 110 and LCM of those two numbers are 300. Find two numbers?
Can anyone answer this question?
Can anyone answer this question?
Post your comments here:
Quick links
Quantitative Aptitude
Verbal (English)
Reasoning
Programming
Interview
Placement Papers