In triangle EFG and triangle YXZ, m<F=m<X and m<E=m<Y. if m<E=62 degrees and m<X=80 degrees, what...

Two angles of a spherical triangle measure 36° and 62°. What is the range for the...

Two angles of a spherical triangle measure 36° and 62°. What is the range for the measure of the third angle? Answer in this form: __<x<___

X and Y are jointly distributed as f(x, y) = 2e^(-x) e^(-y) for 0 < y...

X and Y are jointly distributed as f(x, y) = 2e^(-x) e^(-y) for 0 < y < x < inf If Z = X - Y, What is the density of Z? Draw it.

. (X,Y ) is uniformly distributed over the triangle with vertices (0,0),(2,0),(0,1). Find the density f(z)...

. (X,Y ) is uniformly distributed over the triangle with vertices (0,0),(2,0),(0,1). Find the density f(z) of X −Y for z ≤ 0.

Consider the function f(x,y) = (e^{2x})lny whose domain is {(x,y):  y>0}. What is the equation of the...

Consider the function f(x,y) = (e^{2x})lny whose domain is {(x,y):  y>0}. What is the equation of the plane tangent to the surface z=f(x,y) at (x,y) = (3,5)?

a. Is F(x,y,z)= <(e^z)siny,(e^z)cosx,(e^x)siny> a conservative vector field? Justify. b. Is F incompressible? Explain. Is it...

a. Is F(x,y,z)= <(e^z)siny,(e^z)cosx,(e^x)siny> a conservative vector field? Justify. b. Is F incompressible? Explain. Is it irrotational? Explain. c. The vector field F(x,y,z)= < 6xy^2+e^z, 6yx^2 +zcos(y),sin(y)xe^z > is conservative. Find the potential function f. That is, the function f such that ▽f=F. Use a process.

Let F ( x , y , z ) =< e^z sin( y ) + 3x...

Let F ( x , y , z ) =< e^z sin( y ) + 3x , e^x cos( z ) + 4y , cos( x y ) + 5z >, and let S1 be the sphere x^2 + y^2 + z^2 = 4 oriented outwards Find the flux integral ∬ S1 (F) * dS. You may with to use the Divergence Theorem.

double integral f(x,y)dA. f(x,y) = cos(x) +sin(y). D is the triangle with vertices (-1,-2), (1,0) and...

double integral f(x,y)dA. f(x,y) = cos(x) +sin(y). D is the triangle with vertices (-1,-2), (1,0) and (-1,2). You might notice cos(x) is an even function, sin(y) is an odd function.

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)=...

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)= <xyz,y^2(z),x^2(y)z^3> at (0,-2,2)

Find the flux of the vector field F (x, y, z) =< y, x, e^xz >...

Find the flux of the vector field F (x, y, z) =< y, x, e^xz > outward from the z−axis and across the surface S, where S is the portion of x^2 + y^2 = 9 with x ≥ 0, y ≥ 0 and −3 ≤ z ≤ 3.

Consider the function f:R?R given by f(x,y)=(2-y,2-x). (b) Draw the triangle with vertices A = (1,...

Consider the function f:R?R given by f(x,y)=(2-y,2-x). (b) Draw the triangle with vertices A = (1, 2), B = (3, 1), C = (3, 2), and the triangle with vertices f(A),f(B),f(C). (c) Is f a rotation, a translation, or a glide reflection? Explain your answer.