To solve this problem, we first need to define some key terms and relationships between the numbers involved.
We know:
- The HCF of the two numbers is 33.
- The LCM of the two numbers is 264.
- The first number (let’s call it A) divided by 2 yields a quotient of 33.
The relationship between two numbers and their HCF and LCM is given by the formula:
A × B = HCF × LCM
Where A and B are the two numbers. Now, let’s find A first:
Since when A is divided by 2 the quotient is 33, we can express this as:
- A / 2 = 33
Multiplying both sides by 2 gives:
- A = 33 × 2
- A = 66
Now that we have the value of A, we can substitute it into the relation between A and B:
A × B = HCF × LCM
Substituting the values we know:
- 66 × B = 33 × 264
Calculating the right side:
- 33 × 264 = 8712
This gives us:
- 66 × B = 8712
To find B, we divide both sides by 66:
- B = 8712 / 66
Now performing the division:
- B = 132
Thus, the other number B is 132.
In summary, if the highest common factor (HCF) and least common multiple (LCM) of two numbers are 33 and 264 respectively, and dividing the first number by 2 gives 33, then the other number is 132.