Explanation Given information: The triangle cut from the plane 2 x + 6 y + 3 z = 6 Definition: For a graph z = f ( x , y ) over a region R in the x y -plane , the surface area formula is A = ∬ R f x 2 + f y 2 + 1 d x d y . Calculation: Write the equation. 2 x + 6 y + 3 z = 6 3 z = − 2 x − 6 y + 6 z = − 2 3 x − 6 3 y + 6 3 z = − 2 3 x − 2 y + 2 ( ∵ z = f ( x , y ) ) (1) Find the area of the surface of triangle cut from the plane 2 x + 6 y + 3 z = 6 bounded by the x y -plane . Differentiate Equation (1) with respect to x . f x ( x , y ) = − 2 3 ( 1 ) − 0 + 0 = − 2 3 Differentiate Equation (1) with respect to y . f y ( x , y ) = 0 − 2 ( 1 ) − 0 = − 2 Find f x 2 + f y 2 + 1 . f x 2 + f y 2 + 1 = ( − 2 3 ) 2 + ( − 2 ) 2 + 1 = 4 9 + 4 + 1 = 4 + 36 + 9 9 = 7 3 Find the Surface area ( A ) = ∬ R f x 2 + f y 2 + 1 d x d y . Substitute 7 3 for f x 2 + f y 2 + 1 in Surface area ( A ) = ∬ R x y f x 2 + f y 2 + 1 d x d y . Surface area ( A ) = ∬ R x y f x 2 + f y 2 + 1 d x d y = ∬ R x y 7 3 d A = 7 3 ( Area of the shadow triangle in the x y -plane ) = 7 3 ( 3 2 ) Surface area ( A ) = 7 2 Therefore, the area of the surface of triangle cut from the plane 2 x + 6 y + 3 z = 6 bounded by the x y -plane is 7 2 _ . Write the equation. 2 x + 6 y + 3 z = 6 6 y = − 2 x − 3 z + 6 y = − 2 6 x − 3 6 z + 6 6 y = − 1 3 x − 1 2 z + 1 ( ∵ z = f ( x , z ) ) (2) Find the area of the surface of triangle cut from the plane 2 x + 6 y + 3 z = 6 bounded by the x z -plane . Differentiate Equation (2) with respect to x . f x ( x , z ) = − 1 3 ( 1 ) − 0 + 0 = − 1 3 Differentiate Equation (2) with respect to z . f z ( x , z ) = 0 − 1 2 ( 1 ) = − 1 2 Find f x 2 + f y 2 + 1 . f x 2 + f y 2 + 1 = ( − 1 3 ) 2 + ( − 1 2 ) 2 + 1 = 1 9 + 1 4 + 1 = 4 + 9 + 36 36 = 7 6 Find the Surface area ( A ) = ∬ R f x 2 + f y 2 + 1 d x d y

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ISBN: 9780135910993

Author: Hass

Publisher: PEARSON

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Chapter 15.5, Problem 52E

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Find the area of the surface of triangle cut from the plane 2x+6y+3z=6 by the bounding planes of the first octant.

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Chapter 15.5, Problem 51E

Chapter 15.5, Problem 53E

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Chapter 15 Solutions

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Find the area of the surface of triangle cut from the plane 2x+6y+3z=6 by the bounding planes of the first octant.

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