A triangle in the xy plane is defined with = (0,0), (0, 2) and corners at (x,y) (4, 2). We want to integrate some function f(x, y) over the interior of this triangle. Choosing dx as the inner integral, the required expression to integrate is given by: Select one: So S-o f(x, y) dx dy So So f(x, y) d dy y=0 0= 2y x=0 O J-o Jó F(x, y) dy dx x/2 y=0 x/2 O S So f(x, y) dæ dy 6.

A triangle in the xy plane is defined with = (0,0), (0, 2) and corners at (x,y) (4, 2). We want to integrate some function f(x, y) over the interior of this triangle. Choosing dx as the inner integral, the required expression to integrate is given by: Select one: So S-o f(x, y) dx dy So So f(x, y) d dy y=0 0= 2y x=0 O J-o Jó F(x, y) dy dx x/2 y=0 x/2 O S So f(x, y) dæ dy 6.

University Physics Volume 3

17th Edition

ISBN:9781938168185

Author:William Moebs, Jeff Sanny

Publisher:William Moebs, Jeff Sanny

Chapter7: Quantum Mechanics

Section: Chapter Questions

Problem 12CQ: Explain the difference between time-dependent and independent SchrÖdinger's equations.

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