MAT135H1 Lecture Notes - Lecture 38: Riemann Sum
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At ) is from a individual continuous function for a et eb . We deride the into n to b subdivision. Ot so equal subdivisions and we call the width at been. Left hand sum ft to ) of t t ft -4 ) ot t it fun ) of. , ) ott t fun . lot = f cti ) of. Suppose a to b , written is continuous for att e b. At ) d -l is the limit of a et eb of the left hand or as n gets arbitrarily right hand large , that is sums with n subdivisions as ot o fab fees at. Limo ( left hand sum ) tiny ( ? o ati ) at. Iba fth de finna ( right hand sum ) final fe. Riemann sum f is called the integrand and a and b called the limit of integration .