lcm of 40 and 1365

asked by guest
on Nov 23, 2024 at 4:11 am



You asked:

Find the least common multiple of the following numbers: \(40, 1365\).

MathBot Answer:

Method 1:

The least common multiple of a set of integers is the smallest positive integer divisible by all integers in the set.

The prime factorization of $40$ is $2^{3} \times 5$.

The prime factorization of $1365$ is $3 \times 5 \times 7 \times 13$.

Find the least common multiple by multiplying the prime number powers together, including only the greatest prime number power of each common prime.

$\text{lcm}(40, 1365) = 2^{3} \times 3 \times 5 \times 7 \times 13 = 10920.$


Method 2:

The least common multiple of a set of integers is the smallest positive integer divisible by all integers in the set.

The lcm of two numbers is related to the greatest common denominator of those same two numbers by the following relation: $\text{lcm}(a, b) = \frac{a \times b}{\text{gcd}(a, b)}$.
Therefore:

$\text{gcd}(40, 1365) = 5$

$\text{lcm}(40, 1365) = \frac{40 \times 1365}{5} = \frac{54600}{5} = 10920$