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How do you find the derivative of #5^x log_5 x#?

1 Answer

Shwetank Mauria

Jun 20, 2016

#(df)/(dx)=5^x/(xln5)+5^xlnx#

Explanation:

#f(x)=5^xlog_5x=5^xlnx/ln5#

Hence #(df)/(dx)=1/ln5[5^x xx1/x+lnx xx ln5xx5^x]#

= #5^x/(xln5)+5^xlnx#

[As #d/dx(5^x)=d/dxe^(ln5^x)=d/dxe^(xln5)=ln5e^(xln5)=ln5xx5^x#)

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