The global maximum value of `f(x0=(log)_(10)(4x^3-12 x^2+11 x-3),x in [2,3],` is `-3/2(log)_(10)3` (b) `1+(log)_(10)3` `(log)_(10)3` (d) `3/2(log)_(10)3`

The domain of the function f(x)=(log)_(3+x)(x^2-1) is

Solve : (log)_(0. 3)(x^2-x+1)>0

Solve (log)_2(3x-2)=(log)_(1/2)x

Solve: ((1/2)^(log(10)a^2) +2>3/(2^((log)_(10)(-a))))

The value of 2log 10+3log2 is

Prove that 1/3<(log)_(10)3<1/2dot

Solve (x^(log_(10)3))^(2) - (3^(log_(10)x)) - 2 = 0 .

In a binomial distribution B(n , p=1/4) , if the probability of at least one success is greater than or equal to 9/(10) , then n is greater than (1) 1/((log)_(10)^4-(log)_(10)^3) (2) 1/((log)_(10)^4+(log)_(10)^3) (3) 9/((log)_(10)^4-(log)_(10)^3) (4) 4/((log)_(10)^4-(log)_(10)^3)

Solve: |x-1|^((log)_(10)x)^2-(log)_(10)x^2=|x-1|^3

Which of the following pairs of expression are defined for the same set of values of x ? f_1(x)=2(log)_2xa n df_2(x)=(log)_(10)x^2 f_1(x)=(log)_xx^2a n df_2(x)=2 f_1(x)=(log)_(10)(x-2)+(log)_(10)(x-3)a n df_(2(x))=(log)_(10)(x-2)(x-3)dot