comment if you need further clarification!
For X near ), local linearization gives 1+x. Using a graph, decide if the approximation is an over or underestimate, and estimate to one decimal place the magnitude of the error for -0.9 <x<0.9. typu approximation is an underestimate the absolute tolerance is +/-0.1 Click if you would like to Show Work for this question: Qpen Show Work
Previous Problem Problem List Next Problem (1 point) Find the local linearization of f(x) = x2 at -6. 1_6(x) = Preview My Answers Submit Answers
Find a linearization at a suitably chosen integer near a at which the given function and its derivative are easy to evaluate f(x) = 2 ->, a = 0.01 Set the center of the linearization as x=
4. (5 pts) For f(x) = 210 a. Find the linearization of f(I) at =1 b. Use your linearization to estimate (1.003) 10
Question 9 Let f(x,y) = y Væety. Find the linearization of f at (1, -1). Use the linearization to approximate f(0.9, -1.1).
Consider the function f(x) = x ln(3x+1) (a) Find the derivative (b) Write the linearization of f at x = 2 (c) Use your linearization to estimate f(2.5) (d) Draw a sketch of the function in the space below, using a solid line for f(x). On the same coordinate plane, draw a sketch of the linearization using a dotted line. Please use values 0<x<5(or equal to) on the x-axis (e) Is your estimate from part c an overestimate or underestimate?
3 px (1 point) Given It find the linearization of F at a = L(x) =
Find a linearization if the given function in the indicated number. Subsequently, determine by the local linear approximation the value of: Pregunta 5 Encuentra una linealización de la función dada en el número indicado: f(x) = 5x + *-2, a= 2 Posteriormente, determina mediante la aproximación lineal local el valor de: f (2.125)
Find the linearization of f(x)=1/x^2 at x=2 and use it to approximate the value of 1/1.98^2
(1 point) Find the linearization of the function f(x,y) = 72 - 4x² – 2y at the point (3, 4). L(x,y) Use the linear approximation to estimate the value of f(2.9, 4.1) f(2.9, 4.1)