Calculate the limit for f(x) = 4x + 8 on the interval [1, 4]. lim RN N+00 Consider the limit of the Ath right-endpoint approximation. RN = [ f(XK) k= 1 = >4(1+ 34 ) +8 K= 1 N = 12 1 + NZ' = 12N + 12 N 2 + 2 ) = 18N + 6 lim RN = lim 18N + 6 = 00 N-+00 N-+00 . Identify the first error in the limit of the Nth right-endpoint approximation. The initial summation should be multiplied by the width of each subinterval Ax. The general term in the summation should be 4k + 8. The resulting limit should be 24. There are no errors in the work shown. The upper limit of summation should be 4. Calculate the limit for f(x) = 4x + 8 on the interval [1, 4]. (Express numbers in exact form. Use symbolic notation and fractions where needed. Enter co or -co if the limit is unbounded.) lim RN = Question Source: Rogawski 4e Calculus Early Transcendentals | Publisher: W.H. Freeman -+00