Lagrange Form of the Remainder Term in a Taylor Series
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Lagrange Form of the Remainder Term in a Taylor SeriesQuestions
- What is the Lagrange Form of the Remainder Term in a Taylor Series?
- What is the Remainder Term in a Taylor Series?
- How do you find the Remainder term in Taylor Series?
- How do you find the remainder term #R_3(x;1)# for #f(x)=sin(2x)#?
- How do you find the Taylor remainder term #R_n(x;3)# for #f(x)=e^(4x)#?
- How do you find the Taylor remainder term #R_3(x;0)# for #f(x)=1/(2+x)#?
- How do you use the Taylor Remainder term to estimate the error in approximating a function #y=f(x)# on a given interval #(c-r,c+r)#?
- How do you find the smallest value of #n# for which the Taylor Polynomial #p_n(x,c)# to approximate a function #y=f(x)# to within a given error on a given interval #(c-r,c+r)#?
- How do you find the largest interval #(c-r,c+r)# on which the Taylor Polynomial #p_n(x,c)# approximates a function #y=f(x)# to within a given error?
- How do you find the smallest value of #n# for which the Taylor series approximates the function #f(x)=e^(2x)# at #c=2# on the interval #0<=x<=1# with an error less than #10^(-6)#?
- How do you use lagrange multipliers to find the point (a,b) on the graph #y=e^(3x)# where the value ab is as small as possible?
- Question #a50c7
- #sum_(k=0)^oo(-1)^k ((k+1)/4^(k+1)) =# ?
- What is Lagrange Error and how do you find the value for #M#?