Definite Integral – Finding area between a polynomial and asymptotes – Exercise 6783 Post category:Definite Integral Post comments:0 Comments Exercise Find the area of the region bounded by the graphs of the equations: y=x3−3x2+2x,y=0,x=−1,x=3y=x^3-3x^2+2x, y=0, x=-1, x=3y=x3−3x2+2x,y=0,x=−1,x=3 Final Answer Show final answer S=5S=5S=5 Solution Coming soon… Share with Friends Read more articles Previous PostDefinite integral – area computation of a bounded domain – Exercise 6615 Next PostDefinite Integral – Finding area between a polynomial and a line – Exercise 6793 You Might Also Like Definite Integral – Split function on finite interval – Exercise 6444 July 9, 2019 Definite Integral – A rational function with absolute value on symmetric interval – Exercise 6601 July 16, 2019 Definite Integral – Finding area between two curves – Exercise 6615 July 16, 2019 Definite Integral – A rational function on a symmetric interval – Exercise 6423 July 8, 2019 Definite Integral – A quotient of functions with absolute value on a symmetric interval – Exercise 6431 July 8, 2019 Definite Integral – A polynomial on a symmetric interval – Exercise 6409 July 8, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Definite Integral – A rational function with absolute value on symmetric interval – Exercise 6601 July 16, 2019
Definite Integral – A quotient of functions with absolute value on a symmetric interval – Exercise 6431 July 8, 2019