Directional Derivative – Calculating Derivative in normal direction – Exercise 4305 Post category:Directional Derivative Post comments:0 Comments Exercise Calculate the directional derivative of the function z=ln(x2+y2)z=\ln(x^2+y^2)z=ln(x2+y2) At the point (-4,3) and in the normal direction to the altitude line passing through the point. Final Answer Show final answer 0.40.40.4 Solution Coming soon… Share with Friends Read more articles Previous PostDirectional Derivative – Calculating Derivative in the direction of a normal to a surface – Exercise 4307 Next PostDirectional Derivative – Calculate maximum value and minimum value – Exercise 4302 You Might Also Like Directional Derivative – Calculating Derivative – Exercise 4279 March 24, 2019 Directional Derivative – Calculating Derivative – Exercise 4285 March 24, 2019 Directional Derivative – Calculating Derivative oriented by an angle – Exercise 4290 March 24, 2019 Directional Derivative – Proof that the directional derivative is equal to a certain value – Exercise 4292 March 24, 2019 Directional Derivative – Calculate maximum value – Exercise 4295 March 24, 2019 Directional Derivative – Calculating Derivative oriented by angles – Exercise 4299 March 25, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Directional Derivative – Proof that the directional derivative is equal to a certain value – Exercise 4292 March 24, 2019