Let $\vec { F } = x ^ { 3 } \vec { i } + \left( x + \sin ^ { 3 } y \right) \vec { j }$ (a)Find the line integral $\int _ { C _ { 1 } } \vec { F } \cdot d \vec { r }$ , where C₁is the line from (0, 0)to ( $\pi$ , 0).
(b)Evaluate the double integral $\int _ { R } 1 d A$ where R is the region enclosed by the curve y = sin x and the x-axis for 0 $\le$ x $\le$ $\pi$ .What is the geometric meaning of this integral?
(c)Use Green's Theorem and the result of part (a)to find $\int _ { c _ { 2 } } \vec { F } \cdot d \vec { r }$ where C₂ is the path from (0, 0)to ( $\pi$ , 0)along the curve y = sin x.

Question

Let

\vec { F } = x ^ { 3 } \vec { i } + \left( x + \sin ^ { 3 } y \right) \vec { j }

(a)Find the line integral

\int _ { C _ { 1 } } \vec { F } \cdot d \vec { r }

, where C₁is the line from (0, 0)to (

\pi

, 0).
(b)Evaluate the double integral

\int _ { R } 1 d A

where R is the region enclosed by the curve y = sin x and the x-axis for 0

\le

x

\le

\pi

.What is the geometric meaning of this integral?
(c)Use Green's Theorem and the result of part (a)to find

\int _ { c _ { 2 } } \vec { F } \cdot d \vec { r }

where C₂ is the path from (0, 0)to (

\pi

, 0)along the curve y = sin x.

Quizplus · Accepted Answer

The Answer of Let $\vec { F } = x ^ { 3 } \vec { i } + \left( x + \sin ^ { 3 } y \right) \vec { j }$ (a)Find the line integral $\int _ { C _ { 1 } } \vec { F } \cdot d \vec { r }$ , where C₁is the line from (0, 0)to ($\pi$, 0). (b)Evaluate the double integral $\int _ { R } 1 d A$ where R is the region enclosed by the curve y = sin x and the x-axis for 0 $\le$x $\le$ $\pi$.What is the geometric meaning of this integral? (c)Use Green's Theorem and the result of part (a)to find $\int _ { c _ { 2 } } \vec { F } \cdot d \vec { r }$ where C₂ is the path from (0, 0)to ($\pi$, 0)along the curve y = sin x.

Let F⃗=x3i⃗+(x+sin⁡3y)j⃗\vec { F } = x ^ { 3 } \vec { i } + \left( x + \sin ^ { 3 } y \right) \vec { j }F=x3i+(x+sin3y)j​

Let $\vec { F } = x ^ { 3 } \vec { i } + \left( x + \sin ^ { 3 } y \right) \vec { j }$