Definite Integral
In this part, the constant is removed. If a definite integration is performed, the function is evaluated between the values called limits. Upper and lower i.e. ∫3-2 (x2)dx
Example Evaluate ∫32(3x2)dx
∫3x2 = x3+c, (33 + c) - (23+c)
(27+C) - (8+C) , 27+C-8-C = 19
∫32(3x2)dx = 19
In this part, the constant is removed. If a definite integration is performed, the function is evaluated between the values called limits. Upper and lower i.e. ∫3-2 (x2)dx
Example Evaluate ∫32(3x2)dx
∫3x2 = x3+c, (33 + c) - (23+c)
(27+C) - (8+C) , 27+C-8-C = 19
∫32(3x2)dx = 19
Definite Integral
In this part, the constant is removed. If a definite integration is performed, the function is evaluated between the values called limits. Upper and lower i.e. ∫3-2 (x2)dx
Example Evaluate ∫32(3x2)dx
∫3x2 = x3+c, (33 + c) - (23+c)
(27+C) - (8+C) , 27+C-8-C = 19
∫32(3x2)dx = 19
0 Comments
0 Shares
0 Reviews
