Find a linearization at a suitably chosen integer near a at which the given function and...
Find the local linearization of f (x) = ' near x = 1. f (x) ~ QG
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?
woukd you mind checking my mistake?
Find the linearization of the function f (x) = 74-0 at 2 = 3. L(x) = 5/2-X/2 回国 Evaluate the numbers v1.02 and V0.96 using the linearization. ✓1.02 ~ 3.02 ✓0.96 ~ 2.02
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)
9. Let f(x) = 2Vx. a) Find the differential of the function. b) Find the linearization of f(x) at a = 4. c) Use your answer in part (a) to approximate the value of 2/3.
Find the linearization of the function f(x) = 5 + x2 at x = 2. Explain how you arrive at your answer.
Find the linearization L(x,y) of the function f(x,y)=X - 9xy +7 at Po(5.2). Then find an upper bound for the magnitude El of the error in the approximation fix.y) LIX.y) over the rectangle R X-5 30.5, ly-2 30.5. The linearization of fis Lix,y)=
est f(x) = 3x? -) Find the linearization L(x) off at a = 4. ) Use the linearization to approximate 3(4.1)? c) Find 3(4.1) using a calculator d) What is the difference between the approximation and the actual value of 3(4.1)? a) The linear approximation is L(x)= b) Using the linearization, 3(4.1)2 is approximately (Type an integer or a decimal.) c) Using a calculator, 3(4.1) is (Type an integer or a decimal.) d) The difference between the approximation and the...
3 px (1 point) Given It find the linearization of F at a = L(x) =
Find the linearization L(x.y) of the function f(x,y)=x2 - 4xy+1 at P.(3,3). Then find an upper bound for the magnitude |El of the error in the approximation f(x,y)=L(x,y) over the rectangle R: 1x - 3|50.3, y-3|50.3. The linearization offis L(x,y)= The upper bound for the error of approximation is E(x,y) (Round to the nearest hundredth as needed.)