Prove that `log_7`11 is greater than ` log_(8)5` .

Prove that (log)_(7)10 is greater than (log)_(11)13

Prove that log_(3) 5 is irrational.

(a) Which is smaller ? 2 or (log_(pi) 2 + log_(2) pi) . (b) Prove that log_(3) 5 " and " log_(2) 7 are both irrational.

The number N=(1+2log_(3)2)/((1+log_(3)2)^(2))+log_(6)^(2)2 when simplified reduces to: a prime number an irrational number a real which is less than log_(3)pi a real which is greater than log _(7)6

The least integer greater than log_(2) 15* log_(1//6 2* log_(3) 1//6 is _______.

Comprehension 2 In comparison of two numbers, logarithm of smaller number is smaller, if base of the logarithm is greater than one. Logarithm of smaller number is larger, if base of logarithm is in between zero and one. For example log_2 4 is smaller than (log)_2 8 a n d(log)_(1/2)4 is larger than (log)_(1/2)8. Identify the correct order: (log)_2 6 (log)_3 8> log_3 6>(log)_4 6 (log)_3 8>(log)_2 6> log_3 6>(log)_4 6 (log)_2 8<(log)_4 6

The contrapositive of the statement ''If 7 is greater than 5, then 8 is greater than 6'' is

Comprehension 2 In comparison of two numbers, logarithm of smaller number is smaller, if base of the logarithm is greater than one. Logarithm of smaller number is larger, if base of logarithm is in between zero and one. For example log_2 4 is smaller than (log)_2 8 a n d(log)_(1/2)4 is larger than (log)_(1/2)8. (log)_(2/3)5/6 is- a. less than zero b. greater than zero and less than one c. greater than one d. none of these

Which is greater log_(7) 11 " or " log_(8) 5