Which one is greater :
4^40, 3^50, 6^20.
Give reason also.
BRAINLIEST FOR SURE ✨
Answers
Answered by
1
Solution :
4^40 = ( 4⁴ )^10 = ( 256 )^10
3^50 = ( 3^5 )^10 = ( 243 )^10
6^20 = ( 6² )^10 = ( 36 )^10
Therefore ,
256 > 243 > 36
=> ( 256 )^10 > ( 243 )^10 > ( 36 )^10
=> 4^40 > 3^50 > 6^20
Required greatest number is 4^40
••••
4^40 = ( 4⁴ )^10 = ( 256 )^10
3^50 = ( 3^5 )^10 = ( 243 )^10
6^20 = ( 6² )^10 = ( 36 )^10
Therefore ,
256 > 243 > 36
=> ( 256 )^10 > ( 243 )^10 > ( 36 )^10
=> 4^40 > 3^50 > 6^20
Required greatest number is 4^40
••••
Krais:
Thank you
Answered by
1
HEY MATE HERE IS YOUR ANSWER
Answer :- 4^40
4^40 = (4^4)^10 = 256^10
3^50 = (3^5)^10 = 243^10
6^20 = (6^2)^10 = 36^10
Therefore,
4^40 is greater
Hope it will help you
@thanksforquestion
@bebrainly
Answer :- 4^40
4^40 = (4^4)^10 = 256^10
3^50 = (3^5)^10 = 243^10
6^20 = (6^2)^10 = 36^10
Therefore,
4^40 is greater
Hope it will help you
@thanksforquestion
@bebrainly
Thanks
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