**Factors and Multiples:** If number a divided another number b exactly, we say that a is a factor of b. In this case, b is called a multiple of a.

** Highest Common Factor (H.C.F.) or Greatest Common Measure (G.C.M.) or Greatest Common Divisor (G.C.D.):** The H.C.F. of two or more than two numbers is the greatest number that divided each of them exactly. There are two methods of finding the H.C.F. of a given set of numbers:

**Factorization Method:**Express the each one of the given numbers as the product of prime factors. The product of least powers of common prime factors gives H.C.F.**Division Method:**Suppose we have to find the H.C.F. of two given numbers, divide the larger by the smaller one. Now, divide the divisor by the remainder. Repeat the process of dividing the preceding number by the remainder last obtained till zero is obtained as remainder. The last divisor is required H.C.F.

**Finding the H.C.F. of more than two numbers: S**uppose we have to find the H.C.F. of three numbers, then, H.C.F. of [(H.C.F. of any two) and (the third number)] gives the H.C.F. of three given number. Similarly, the H.C.F. of more than three numbers may be obtained.**Least Common Multiple (L.C.M.):** The least number which is exactly divisible by each one of the given numbers is called their L.C.M. There are two methods of finding the L.C.M. of a given set of numbers:

**Factorization Method:**Resolve each one of the given numbers into a product of prime factors. Then, L.C.M. is the product of highest powers of all the factors.**Division Method (short-cut):**Arrange the given numbers in a rwo in any order. Divide by a number which divided exactly at least two of the given numbers and carry forward the numbers which are not divisible. Repeat the above process till no two of the numbers are divisible by the same number except 1. The product of the divisors and the undivided numbers is the required L.C.M. of the given numbers.

**Product of two numbers =** Product of their H.C.F. and L.C.M.**Co-primes:** Two numbers are said to be co-primes if their H.C.F. is 1.

H.C.F. and L.C.M. of Fractions:

1. H.C.F. = H.C.F. of Numerators/ L.C.M. of Denominators

2. L.C.M. = L.C.M. of Numerators/ H.C.F. of Denominators**H.C.F. and L.C.M. of Decimal Fractions:** In a given numbers, make the same number of decimal places by annexing zeros in some numbers, if necessary. Considering these numbers without decimal point, find H.C.F. or L.C.M. as the case may be. Now, in the result, mark off as many decimal places as are there in each of the given numbers.**Comparison of Fractions:** Find the L.C.M. of the denominators of the given fractions. Convert each of the fractions into an equivalent fraction with L.C.M as the denominator, by multiplying both the numerator and denominator by the same number. The resultant fraction with the greatest numerator is the greatest.

**Application of H.C.F. **

The greatest natural number that will divide x, y and z leaving remainders r1, r2 and r3, respectively, is the H.C.F. of (x - r1), (y - r2) and (z - r3)

**Application of L.C.M. **

The smallest natural number that is divisible by x, y and z leaving the same remainder r in each case is the L.C.M. of (x, y and z) + r