CBSE Class 12-science Maths Logarithmic Functions
Revisit the concepts related to CBSE Class 12 Science Mathematics Continuity and Differentiability – Logarithmic Functions through TopperLearning’s learning resources. Learn to find the derivative of the given parametric functions by grasping the concept of differentiation using logarithmic functions in our concept videos.
Our Maths experts help you to understand the application of base changing formula while taking you through logarithmic differentiation. In addition, explore our Sample Q&A, textbook solutions and CBSE Class 12 Science Mathematics practice papers. These resources will come in handy during your Maths self-study sessions and will support you in your efforts to pass your Class 12 Mathematics board exam with flying colours.
- What is the maximum value of x^1/x
- a^{x............... } if y = a^{x} prove that dy/dx = y^{2}(log y)/x{1 – y(logx)(logy)} explain in great detail
- if y = e^{sinx} + (tan x)^{x} , prove that dy/dx = e^{sin x} cos x + (tan x)^{x} [2x cosec 2x + log tan x]
- If x^{m}y^{n}= (x+y)^{m+n}, prove that dy/dx = y/x Mention each and every step
- If y = x^{cot x} + 2x^{2} – 3/x^{2} + x + 2, find dy/dx Mention each and every step
- If y = (sin x)^{x} + sin^{-1} (x)^{1/2}, find dy/dx Mention each and every step
- find dy/dx y = (log x)^{x} + (x)^{log x} mention each and every formula and minute details
- find dy/dx mention each and every formula and minute steps and detail Y = x^{x} . e^{(2x + 5)}
- Differentiate x^{sinx} w. r. to x.
- Differentiate (log x)^{cot x} w. r. to x.