Two numbers are in the ratio 3:4. If their H.C.F. is 36, find :(i) the numbers (ii) their L.C.M. [tex]chapter \: name \: = \: hcf \: and \: lcm[/tex] About the author Savannah
ANSWER: Given: Ratio of 2 numbers = 3 : 4 HCF = 36 To Find: the numbers their LCM Solution: We are given that, ⇒ Ratio of 2 numbers = 3 : 4 So,let the numbers be 3x and 4x respectively. We know that, HCF of 2 numbers means the maximum number with which both the numbers can be completely divided. Hence, ⇒ HCF of the numbers 3x and 4x = x But, we are given that, ⇒ HCF = 36 So, ⇒ x = 36 Therefore, the numbers are: 3x = 3×36 = 108 4x = 4×36 = 144 The numbers are 108 and 144. Now, we know that, for 2 numbers a and b, ⇒ a × b = HCF × LCM Here, a = 108; b = 144; and HCF = 36 So, ⇒ 108 × 144 = 36 × LCM ⇒ LCM = (108 × 144)/36 ⇒ LCM = 108 × 4 ⇒ LCM = 432 The LCM of the numbers is 432. The numbers are 108 and 144 respectively with LCM 432. Formula Used: a × b = HCF × LCM Reply
Answer: Numbers=108,144 LCM=432 Step-by-step explanation: Let the numbers be 3x and 4x HCF=36 HCF=x Numbers= 3*36,4*36 = 108,144 LCM= 432 Reply
ANSWER:
Given:
To Find:
Solution:
We are given that,
⇒ Ratio of 2 numbers = 3 : 4
So,let the numbers be 3x and 4x respectively.
We know that, HCF of 2 numbers means the maximum number with which both the numbers can be completely divided.
Hence,
⇒ HCF of the numbers 3x and 4x = x
But, we are given that,
⇒ HCF = 36
So,
⇒ x = 36
Therefore, the numbers are:
The numbers are 108 and 144.
Now, we know that, for 2 numbers a and b,
⇒ a × b = HCF × LCM
Here, a = 108; b = 144; and HCF = 36
So,
⇒ 108 × 144 = 36 × LCM
⇒ LCM = (108 × 144)/36
⇒ LCM = 108 × 4
⇒ LCM = 432
The LCM of the numbers is 432.
The numbers are 108 and 144 respectively with LCM 432.
Formula Used:
Answer:
Numbers=108,144
LCM=432
Step-by-step explanation:
Let the numbers be 3x and 4x
HCF=36
HCF=x
Numbers= 3*36,4*36
= 108,144
LCM= 432