Maths-
General
Easy
Question
Find the LCM of 12 and 14 :
- 20
- 14
- 84
- 12
The correct answer is: 84
![](data:image/png;base64,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)
LCM of 12 and 14 : 2 *2*3*7 =84
Related Questions to study
Maths-
Find the lCM of 6 and 7 :
Find the lCM of 6 and 7 :
Maths-General
Maths-
Find the GCF of 9 and 15 :
Find the GCF of 9 and 15 :
Maths-General
Maths-
Find the LCM of 6 and 5:
Find the LCM of 6 and 5:
Maths-General
Maths-
Find the GCF of 14 and 16 :
Find the GCF of 14 and 16 :
Maths-General
Maths-
Find the LCM of 6 and 9 :
Find the LCM of 6 and 9 :
Maths-General
Maths-
Divide 49 by 13:
Divide 49 by 13:
Maths-General
Maths-
Convert 5 6/7 into improper fraction :
Convert 5 6/7 into improper fraction :
Maths-General
Maths-
find the LCM of 9 and 14 :
find the LCM of 9 and 14 :
Maths-General
Maths-
Find the GCF of 9 and 15:
Find the GCF of 9 and 15:
Maths-General
Maths-
Find the curved surface area of cube , If its side is 10cm:
Find the curved surface area of cube , If its side is 10cm:
Maths-General
Maths-
Find the LCM of 12 and 20 :
Find the LCM of 12 and 20 :
Maths-General
Maths-
solve : 6 * 0.6
solve : 6 * 0.6
Maths-General
Maths-
Find the LCM of 5 and 15:
Find the LCM of 5 and 15:
Maths-General
Maths-
Find the ¾ of 720:
Find the ¾ of 720:
Maths-General
Physics-
The probability density plots of 1s and 2s orbitals are given in figure
![](data:image/png;base64,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)
The density of dots in region represents the probability density of finding electrons in the region. On the basis of above diagram which of the following statements is incorrect?
The probability density plots of 1s and 2s orbitals are given in figure
![](data:image/png;base64,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)
The density of dots in region represents the probability density of finding electrons in the region. On the basis of above diagram which of the following statements is incorrect?
Physics-General