MTH 161 Lecture 25: 4.3 Evaluating Definite Integrals Notes
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Provide a generalization to each of the key terms listed in this section. If you let both f = f and f being continuous while on the close interval of [a, b], then the following would occur: [f (x)] dx = f (b) f (a) The standard (or positional/position) formula, which is normally s(t) of any moving object while at time, which is t, which means that its velocity is the following: v(t) = s (t) If that is the case, then you can use the following theorem to gure out the displacement that"s actually between the times of both a and b , which can be written by the following formula: Z b a v (t) dx = s (b) s (a) The displacement can normally be either positive, which occurs when the object is moving either upward to to the right, or even negative, which occurs when the object is moving either downward to to the left.
