Two positive integers a and b can be written as a = m³ n² and b = m n³ , m,n are prime numbers, then find LCM ( a,b)… About the author Gabriella
Answer: in LCM we take highest power So LCM of a and b is m3 n3 Step-by-step explanation: Hope this helps you Reply
Step-by-step explanation: 2. Subtract the sum of -32 and 50 from the difference of – 390 and 542. 3. Simplify { 30 ÷ (-5) } ÷ { ( 8 – 12) 4. What will be the sign of the product, if we multiply Reply
Answer:
in LCM we take highest power
So LCM of a and b is m3 n3
Step-by-step explanation:
Hope this helps you
Step-by-step explanation:
2. Subtract the sum of -32 and 50 from the difference of – 390 and 542.
3. Simplify { 30 ÷ (-5) } ÷ { ( 8 – 12)
4. What will be the sign of the product, if we multiply