Definition of LCM

LCM stands for least common multiple. In mathematics, LCM of two numbers 90 and 140, is defined as the smallest positive integer that is divisible by both. It is written as LCM(90, 140).

Properties of LCM

  • LCM follows associative property, that means LCM(90, 140) = LCM(140, 90).
  • LCM follows commutative property, which means LCM(a, b, c) = LCM(LCM(a, b), c) = LCM(a, LCM(b, c)).
  • LCM follows distributive property, which means LCM(ab, bc, ad) = d * LCM(x, y, z).
  • The LCM of two given numbers is never less than any of those numbers. Eg- LCM of 90 and 140 is 1260, where 90 and 140 are less than 1260.
  • The LCM of two or more prime numbers is their product.

Steps to find lcm of 90 and 140 by Listing Method

Example: Find lcm of 90 and 140 by Listing Method

  • Multiples of 90: 90, 180, 270, 360, 450, 540, 630, 720, 810, 900, 990, 1080, 1170, 1260, 1350, 1440, 1530, 1620, 1710, 1800, 1890, 1980, 2070, 2160, 2250, 2340, 2430, 2520, 2610, 2700, 2790, 2880, 2970, 3060, 3150, 3240, 3330, 3420, 3510, 3600, 3690, 3780, 3870, 3960, 4050, 4140, 4230, 4320, 4410, 4500, 4590, 4680, 4770, 4860, 4950, 5040, 5130, 5220, 5310, 5400, 5490, 5580, 5670, 5760, 5850, 5940, 6030, 6120, 6210, 6300, 6390, 6480, 6570, 6660, 6750, 6840, 6930, 7020, 7110, 7200, 7290, 7380, 7470, 7560, 7650, 7740, 7830, 7920, 8010, 8100, 8190, 8280, 8370, 8460, 8550, 8640, 8730, 8820, 8910, 9000, 9090, 9180, 9270, 9360, 9450, 9540, 9630, 9720, 9810, 9900, 9990, 10080, 10170, 10260, 10350, 10440, 10530, 10620, 10710, 10800, 10890, 10980, 11070, 11160, 11250, 11340, 11430, 11520, 11610, 11700, 11790, 11880, 11970, 12060, 12150, 12240, 12330, 12420, 12510, 12600
  • Multiples of 140: 140, 280, 420, 560, 700, 840, 980, 1120, 1260, 1400, 1540, 1680, 1820, 1960, 2100, 2240, 2380, 2520, 2660, 2800, 2940, 3080, 3220, 3360, 3500, 3640, 3780, 3920, 4060, 4200, 4340, 4480, 4620, 4760, 4900, 5040, 5180, 5320, 5460, 5600, 5740, 5880, 6020, 6160, 6300, 6440, 6580, 6720, 6860, 7000, 7140, 7280, 7420, 7560, 7700, 7840, 7980, 8120, 8260, 8400, 8540, 8680, 8820, 8960, 9100, 9240, 9380, 9520, 9660, 9800, 9940, 10080, 10220, 10360, 10500, 10640, 10780, 10920, 11060, 11200, 11340, 11480, 11620, 11760, 11900, 12040, 12180, 12320, 12460, 12600

Hence, LCM of 90 and 140 is 1260.

Steps to find LCM of 90 and 140 by Common Division Method

Example: Find lcm of 90 and 140 by Common Division Method

2 90 140
2 45 70
3 45 35
3 15 35
5 5 35
7 1 7
1 1

Hence, LCM of 90 and 140 is 2 x 2 x 3 x 3 x 5 x 7 = 1260.

Steps to find lcm of 90 and 140 by Formula

Example: Find lcm of 90 and 140 by Formula

  • GCF of 90 and 140 = 10
  • LCM of 90 and 140 = (90 x 140) / 10
  • => 12600 / 10

Hence, LCM of 90 and 140 is 1260.

Examples

A shopkeeper sells candies in packet of 90 and chocolates in packet of 140. What is the least number of candies and chocolates Annie should buy so that there will be one candy for each chocolate?

The least number of candies and chocolates Annie should buy so that there will be one candy for each chocolate we need to find the lcm of 90 and 140.
So, LCM of 90 and 140 is 1260.

Both the cricket team and the rugby team had games, today. The cricket team plays every 90 days and the basketball team plays every 140 days. When will both teams have games on the same day again?

Given that the cricket team plays every 90 days and the basketball team plays every 140 days, so for finding the next time when both teams will play again we need to find the LCM of 90 and 140.
So, LCM of 90 and 140 is 1260.

Steve spends 90 dollars every day while George spends 140 dollars every day. What is the least number of days it will take each person to spend the same amount of money?

To find the least number of days that would be taken to be able to spend the same amount of dollars we need to find the LCM of 90 and 140.
So, LCM of 90 and 140 is 1260.

Sammy's company prints 90 textbooks at a time. Daniel's company prints textbooks in sets of 140 at a time. According to a survey done by a committee, both companies printed the same number of textbooks last year. Find the least number of books that each company would have printed.

To find the least number of textbooks that each company could have printed we need to find the LCM of 90 and 140.
So, LCM of 90 and 140 is 1260.

Ariel exercises every 90 days and Rubel every 140 days. They both excercised today. How many days will it be until they excercise together again?

The problem can be solved using LCM, because we are trying to figure out the least time until they excercise together again.
So, LCM of 90 and 140 is 1260.

Find the least common multiple of 90 and 140.

Least common multiple of 90 and 140 is 1260.

Find the least number which is exactly divisible by 90 and 140.

Least number which is exactly divisible by 90 and 140 is 1260.