What is the Remainder Term in a Taylor Series? Calculus Power Series Lagrange Form of the Remainder Term in a Taylor Series 1 Answer Wataru Sep 20, 2014 Taylor remainder term #R_n(x;c)={f^{(n+1)}(z)}/{(n+1)!}(x-c)^{n+1}#, where #z# is between #x# and #c#. Answer link Related questions What is the Lagrange Form of 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... How do you find the smallest value of #n# for which the Taylor Polynomial #p_n(x,c)# to... How do you find the largest interval #(c-r,c+r)# on which the Taylor Polynomial #p_n(x,c)#... How do you find the smallest value of #n# for which the Taylor series approximates the function... How do you use lagrange multipliers to find the point (a,b) on the graph #y=e^(3x)# where the... See all questions in Lagrange Form of the Remainder Term in a Taylor Series Impact of this question 3147 views around the world You can reuse this answer Creative Commons License