HCF of 18 and 45 is the largest possible number which divides 18 and 45 without leaving any remainder. The methods to compute the HCF of 18, 45 are explained here.
Therefore, the value of HCF of 170 and 238 is 34. ☛ Also Check: HCF of 1 and 3= 1 HCF of 1872 and 1320= 24 HCF of 72 and 120= 24 HCF of 64 and 96= 32 HCF of 106, 159 and 265= 53 HCF of 20 and 25= 5 HCF of 18 and 45= 9 HCF of 170 and 238 Examples Example ...
To solve the problem of calculating the product of the LCM (Least Common Multiple) and HCF (Highest Common Factor) of the numbers 4 and 18, we can follow these steps:Step 1: Identify the two numbers Let \( x = 4 \) and \( y = 1
The smallest power of 2 is 21.The smallest power of 3 is 31.There is no common prime factor of 7 in both numbers. To calculate the HCF, multiply all of the common prime factors together.HCF = 2^1 * 3^1 = 2 * 3 = 6Therefore, the HCF of 18 and 28 is 6....
To find the Highest Common Factor (HCF) and Lowest Common Multiple (LCM) of two positive integers, we can follow these steps:1. Factorization of the Numbers: - Let's consider two positive integers, \( a \) and \( b \). -
Highest Common Factor (HCF):The largest or greatest factor common to any two or more given natural numbers is termed asHCF of given numbers. Also known as GCD (Greatest Common Divisor). For example, HCF of 4, 6 and 8 is 2. 4 = 2 × 2 ...
HCF of co-prime numbers 4 and 15 was found as follows by factorisation:4 = 2 × 2 and 15 =3 × 5 since there is no common prime factor, so HCF of 4 and 15 is 0.Is the answer correct? If not, what is the correct HCF?
百度试题 结果1 题目1. (a) Find the HCF of 42, 66 and 78.(b)Find the LCM of 9, 16 and 18. 相关知识点: 试题来源: 解析 1. (a) 6(b) 144 反馈 收藏
The HCF of 56 and 57 is 1. Learn to calculate the Highest Common Factor of 56 and 57 using prime factorisation, long division method and listing common factors with simple steps, at BYJU’S.
HCF of 120 and 144 is the largest possible number which divides 120 and 144 without leaving any remainder. The methods to compute the HCF of 120, 144 are explained here.