WebLet g(x, y, z) = sin(xyz). (a) Compute the gradient Vg(1, 0, π/2). (b) Compute the directional derivative Dug(1, 0, π/2) where u = (1/√2,0, 1/√2). (c) Find all the directions u for which … Webderivative of x^2. Natural Language; Math Input; Extended Keyboard Examples Upload Random. Compute answers using Wolfram's breakthrough technology & knowledgebase, relied on by millions of students & professionals. For math, science, nutrition, history, geography, engineering, mathematics, linguistics, sports, finance, music…
What is the derivative of #1/sqrt(1 - x^2)#? - Socratic.org
WebNov 20, 2011 · Cheap, non-rigorous, non-mathematical, engineering-type answer: sgn(x) ("signum x", the sign of x, being -1 for x<0 and +1 for x>0).Note that sgn(0) = 0, which is a practical compromise, being the average of -1 ("coming from the negatives") and +1 ("coming from the positives").. Of course we all know that d x /dx is not defined at … WebΔy/Δx = (y2-y1)/ (x2-x1) but in dy/dx the difference between the two points like x2 and x1 is taken to be much smaller or more accurately using limits to approach 0 for getting the slope at a single point. The derivative so gives the slope of a tangent line that touches a curve only once. The slope formula in contrast gives the slope of a ... chuck e. cheese and tyler
1) For the function \( \left.f(x, y)=(x-1)^{2}+6 Chegg.com
WebApr 12, 2024 · The derivative is x√1 −x2 (1 − x2)2. Explanation: Using the quotient rule: = d dx [ 1 √1 −x2] = d dx[1] ⋅ √1 − x2 −1 ⋅ d dx[√1 − x2] (√1 − x2)2 = 0 ⋅ √1 − x2 −1 ⋅ d dx[√1 − x2] 1 − x2 = − d dx[√1 − x2] 1 −x2 Chain rule: = − 1 2√1−x2 ⋅ d dx[1 −x2] 1 −x2 = − 1 2√1−x2 ⋅ − 2x 1 − x2 = x √1−x2 1 − x2 = x√1−x2 1−x2 1 −x2 = x√1 − x2 (1 − x2)2 WebHow to use Derivative Calculator 1 Step 1 Enter your derivative problem in the input field. 2 Step 2 Press Enter on the keyboard or on the arrow to the right of the input field. 3 Step 3 In the pop-up window, select “Find the Derivative”. You can also use the search. What is Derivative in Math WebLet g(x, y, z) = sin(xyz). (a) Compute the gradient Vg(1, 0, π/2). (b) Compute the directional derivative Dug(1, 0, π/2) where u = (1/√2,0, 1/√2). (c) Find all the directions u for which the directional derivative Dug(π, 0, π/2) is zero. (d) What are the directions u for which the above directional derivative reaches its maximum? and ... chuck e cheese and showbiz pizza