Using the definition of definite integral as the limit of a sum evaluate `int_(0)^(2)axdx` where a is a constant.

Using the definition of definite integral as the limit of a sum, evaluate : int_(a)^(b)2^(x)dx

From the definition of definite integral as the limit of a sum, evaluate: int_(a)^(b)kdx , where k is a constant

Using the definition of definite integral as the limit of a sum, evaluate : int_(a)^(b) (2x+3)dx

Using the definition of definite integral as the limit of a sum, evaluate : int_(a)^(b) 3k-9dx

Evaluate using the definition of definite integral as the limit of a sum : int_(0)^(2)3xdx

Evaluate using the definition of definite integral as the limit of a sum : int_(0)^(1)xdx

From the definition of definite integral as the limit of a sum, evaluate: int_(1)^(2)5x^(2)dx

From the definition of definite integral as the limit of a sum, evaluate: int_(a)^(1)(ax+b)dx

Using the definition of definite integral as the limit of a sum evaluate int_(a)^(b)cdx where a, b, c, are three constants and b gt a.

Evaluate using the definition of definite integral as the limit of a sum : int_(a)^(b)6dx