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13 Nov 2019
Consider the function f(x)=1/x^2
Let Tn be the nth degree Taylor approximation of f(1.02) about x=1
.
1 point) Consider the function f(x) - z Let T,l be the nth degree Taylor approximation of f(1.02) about z tind 1. Use 4 decimal places in your answer, but make sure you carry all decimals when preforming calculations T2 is a (over/under) estimate of f(1.02). If R2 is the remainder given by the Lagrange Remainder Formula:
Consider the function f(x)=1/x^2
Let Tn be the nth degree Taylor approximation of f(1.02) about x=1
.
1 point) Consider the function f(x) - z Let T,l be the nth degree Taylor approximation of f(1.02) about z tind 1. Use 4 decimal places in your answer, but make sure you carry all decimals when preforming calculations T2 is a (over/under) estimate of f(1.02). If R2 is the remainder given by the Lagrange Remainder Formula:
Keith LeannonLv2
13 Nov 2019