log(10)100=……………...

`log_(10)100=……………`

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x^(3log_(10)^(3)x)-(2)/(3)log_(10)x=100(10)^((3)/(2))

Solve : (i) x^(log_(10)x)= 100x .

Product of roots of equation x^(log_(10)x)=100x is

Solve (x+1)^(log_(10)(x+1))=100(x+1)

Product of all the solution of equation x^(log_(10)x)=(100+2^(sqrt(log_(2)3))-3^(sqrt(log_(3)2)))x is

Product of all the solution of equation x^(log_(10)x)=(100+2^(sqrt(log_(2)3))-3sqrt(log_(3)2))x is

If (x+1)^((log)_(10)(x+1))=100(x+1), then

If x_(1) and x_(2) satisfy the equation x^(log_(10)x)=100x then the value of x_(1)x_(2) equals

If x_1 and x_2 are the solutions of the equation x^(log_(10)x)=100x such that x_1gt1 and x_2lt1 , the value of (x_1x_2)/2 is

If x_1 and x_2 are the solutions of the equation x^(log_(10)x)=100x such that x_1gt1 and x_2lt1 , the value of (x_1x_2)/2 is

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