1- Evaluate the closed line integral of H about the path P1 (3, 2, 1) to...

Evaluate the surface integral Evaluate the surface integral S F · dS for the given vector...

Evaluate the surface integral Evaluate the surface integral S F · dS for the given vector field F and the oriented surface S. In other words, find the flux of F across S. For closed surfaces, use the positive (outward) orientation. F(x, y, z) = x i + y j + 9 k S is the boundary of the region enclosed by the cylinder x2 + z2 = 1 and the planes y = 0 and x + y =...

Evaluate the line integral of " (y^2)dx + (x^2)dy " over the closed curve C which...

Evaluate the line integral of " (y^2)dx + (x^2)dy " over the closed curve C which is the triangle bounded by x = 0, x+y = 1, y = 0.

(1 point) Evaluate the line integral ∫F⋅d r∫CF⋅d r where F=〈-5sinx,-2cosy,10xz〉 and C is the path...

(1 point) Evaluate the line integral ∫F⋅d r∫CF⋅d r where F=〈-5sinx,-2cosy,10xz〉 and C is the path given by r(t)=(2t^3,-3t^2,-2t) for 0≤t≤10≤t≤1 ∫F⋅d r=

let p1(x) = x^2-3x-10 ,p2(x)=x^2-5x+1,p3(x)=x^2+2x+3 and p4(x)=x+5 a- As an alternative ; we can form additional...

let p1(x) = x^2-3x-10 ,p2(x)=x^2-5x+1,p3(x)=x^2+2x+3 and p4(x)=x+5 a- As an alternative ; we can form additional equation involving a1,a2,a3,and a4 using differntiation.explain how how to produce a system of equation with unknown constant a1,a2,a3,a4. Since there are 4 unknown ,you will need 4 equattion find them b- Find Basis for the vector space spanned by p1(X),p2(x),p3(x),p4(x). express any reductant vector in terms of linear combination of the others .Note you might want to use row in the changes?

2. Let P 1 and P2 be planes with general equations P1 : −2x + y...

2. Let P 1 and P2 be planes with general equations P1 : −2x + y − 4z = 2, P2 : x + 2y = 7. (a) Let P3 be a plane which is orthogonal to both P1 and P2. If such a plane P3 exists, give a possible general equation for it. Otherwise, explain why it is not possible to find such a plane. (b) Let ` be a line which is orthogonal to both P1 and P2....

Evaluate the line integral ∫F⋅d r∫CF⋅d r where F=〈sinx,−3cosy,5xz〉 and C is the path given by...

Evaluate the line integral ∫F⋅d r∫CF⋅d r where F=〈sinx,−3cosy,5xz〉 and C is the path given by r(t)=(-2t^3,-3t^2,3t) for 0≤t≤1

Let P1 = number of Product 1 to be produced P2 = number of Product 2...

Let P1 = number of Product 1 to be produced P2 = number of Product 2 to be produced P3 = number of Product 3 to be produced P4 = number of Product 4 to be produced Maximize 15P1 + 20P2 + 24P3 + 15P4 Total profit Subject to 8P1 + 12P2 + 10P3 + 8P4 ≤ 3000 Material requirement constraint 4P1 + 3P2 + 2P3 + 3P4 ≤ 1000 Labor hours constraint P2 > 120 Minimum quantity needed for...

2. Consider the line integral I C F · d r, where the vector field F...

2. Consider the line integral I C F · d r, where the vector field F = x(cos(x 2 ) + y)i + 2y 3 (e y sin3 y + x 3/2 )j and C is the closed curve in the first quadrant consisting of the curve y = 1 − x 3 and the coordinate axes x = 0 and y = 0, taken anticlockwise. (a) Use Green’s theorem to express the line integral in terms of a double...

You work for Microsoft in their global smart phone group. You have been made project manager...

You work for Microsoft in their global smart phone group. You have been made project manager for the design of a new smart phone. Your supervisors have already scoped the project so you have a list showing the work breakdown structure and this includes major project activities. You must plan the project schedule and calculate project duration. Your boss wants the schedule on his desk tomorrow morning!      You have been given the information in Exhibit 5.13. It includes all the...

N moles of this gas undergoes the following cyclical process composed of four reversible steps: i....

N moles of this gas undergoes the following cyclical process composed of four reversible steps: i. Isovolumetric cooling from state 1 (T1 and P1) to State 2 (T2 and P2); ii. Isothermal expansion from state 2 (T2 and P2) to state 3 (T2 and P3); iii. Isovolumetric heating from state 3 (T2 and P3) back to state 4 (T4 and P4); and iv. Adiabatic compression from state 4 (T4 and P4) to state 1 (T1 and P1). We know that...