Use Green’s Theorem to compute \(\int_{C} {\bf F} \cdot {\bf…
Use Green’s Theorem to compute \(\int_{C} {\bf F} \cdot {\bf dr}\) where \(C\) is the triangle with vertices \((0,2)\), \((-1,-1)\), \((3,-1)\) oriented counter-clockwise, and \({\bf F}= \langle y^{2}+\ln|1+x^{2}|, x(2y+1), e^{\sqrt{1+y^{2}}} \rangle.\)
Read DetailsCompute \(\oint_{C}{\bf F}\cdot d{\bf r}\) where \(C\) is th…
Compute \(\oint_{C}{\bf F}\cdot d{\bf r}\) where \(C\) is the curve parametrized by \({\bf r}(t)= \langle \cos t,\sin t, \cos t+\sin t \rangle, \quad 0\leq t\leq 2\pi\) and where \({\bf F}=(xy+z){\bf i}+z^2{\bf j}+xyz{\bf k}\) [Hint: The curve lies on the surface \(z=x+y\)]
Read DetailsEvaluate the integral \(\int_{C} {\bf F} \cdot {\bf dr} \) w…
Evaluate the integral \(\int_{C} {\bf F} \cdot {\bf dr} \) where \({\bf F}=\left( \frac{1}{x}+y \right) {\bf i} + \left( \frac{1}{y} + x \right) {\bf j}\) and \(C\) is a smooth curve with starting point \((1,1)\) and end point \((2,3)\).
Read Details5.1 Poverty can be described as (1) A. the s…
5.1 Poverty can be described as (1) A. the state of not having enough material possessions or income for a person’s basic needs. B. having enough material possessions to live comfortably. C. a condition that results from eating a diet which does not supply a healthy amount of nutrients. D. the condition of not having adequate housing.
Read Details3. Match column A with column B (5) COLUMN A…
3. Match column A with column B (5) COLUMN A COLUMN B 3.1. To have supreme power or authority. A. Electorate 3.2. Example of a non-sovereign state. B. Sovereignty 3.3. It is a system of government in which power and authority are controlled by a single person or party. C. Nation-state 3.4. A cultural group that is also a state. D. Hong Kong 3.5. All the people in a country who are allowed to vote. E. Totalitarian
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