7) Identify
the true statement
The A) (HCF
A) (HCE • LCM) of X and y
B) CHCF + LCM) of x andy
se) (HCE + LOM) ot x and yo
d) CHCE X LCM) Of x and Y. (A
on
Answers
Answer:
The answer is LCM is the least common multiple of two or more integers. Since, here x and y are both prime to each other y doesn't divide any multiple of x less than xy and x does the same. So, the least common multiple of x and y is xy.
We will learn the relationship between H.C.F. and L.C.M. of two numbers.
First we need to find the highest common factor (H.C.F.) of 15 and 18 which is 3.
Then we need to find the lowest common multiple (L.C.M.) of 15 and 18 which is 90.
H.C.F. × L.C.M. = 3 × 90 = 270
Also 15 × 18 = 270
Therefore, product of H.C.F. and L.C.M. of 15 and 18 = product of 15 and 18.
So, from the above explanation we conclude that the product of highest common factor (H.C.F.) and lowest common multiple (L.C.M.) of two numbers is equal to the product of two numbers
or, H.C.F. × L.C.M. = First number × Second number
or, L.C.M. = First number × Second number/ H.C.F.
Solved examples on the relationship between H.C.F. and L.C.M.:
1. Find the L.C.M. of 1683 and 1584.
First we find highest common factor of 1683 and 1584
Relationship between H.C.F. and L.C.M.
Therefore, highest common factor of 1683 and 1584 = 99
Lowest common multiple of 1683 and 1584 = First number × Second number/ H.C.F.
= 1584 × 1683/99
= 26928
2. Highest common factor and lowest common multiple of two numbers are 18 and 1782 respectively. One number is 162, find the other.
We know, H.C.F. × L.C.M. = First number × Second number then we get,
18 × 1782 = 162 × Second number
18 × 1782/162 = Second number
Therefore, the second number = 198
3. The highest common factor and the lowest common multiple of two numbers are 825 and 25 respectively. If one of the two numbers is 275, find the other number.
We know, H.C.F. × L.C.M. = First number × Second number then we get,
825 × 25 = 275 × Second number
825 × 25/ 275 = Second number
Therefore, the second number = 75