Question

In: Advanced Math

6.14 Let f = {(x, y) ∈ R2 : y = x5 + 4x3 + x...

6.14 Let f = {(x, y) ∈ R2 : y = x5 + 4x3 + x + 1}.

  1. Prove that (a) f is onto. (b) f is 1-1.

  1. Prove that g = {(x, y) ∈ R2 : x = y5 + 4y3 + y + 1} is a function. (You will need to use calculus to prove part (1).)

Solutions

Expert Solution


Related Solutions

The curried version of let f (x,y,z) = (x,(y,z)) is let f (x,(y,z)) = (x,(y,z)) Just...
The curried version of let f (x,y,z) = (x,(y,z)) is let f (x,(y,z)) = (x,(y,z)) Just f (because f is already curried) let f x y z = (x,(y,z)) let f x y z = x (y z)
On R2, consider the function f(x, y) = ( .5y, .5sinx). Show that f is a...
On R2, consider the function f(x, y) = ( .5y, .5sinx). Show that f is a strict contraction on R2. Is the Banach contraction principle applicable here? If so, how many fixed points are there? Can you guess the fixed point?
5. Let X, Y and Z be sets. Let f : X ! Y and g...
5. Let X, Y and Z be sets. Let f : X ! Y and g : Y ! Z functions. (a) (3 Pts.) Show that if g f is an injective function, then f is an injective function. (b) (2 Pts.) Find examples of sets X, Y and Z and functions f : X ! Y and g : Y ! Z such that g f is injective but g is not injective. (c) (3 Pts.) Show that if...
Let f(x, y) = − cos(x + y2 ) and let a be the point a...
Let f(x, y) = − cos(x + y2 ) and let a be the point a = ( π/2, 0). (a) Find the direction in which f increases most quickly at the point a. (b) Find the directional derivative Duf(a) of f at a in the direction u = (−5/13 , 12/13) . (c) Use Taylor’s formula to calculate a quadratic approximation to f at a.
Let f (x, y) = c, 0 ≤ y ≤ 4, y ≤ x ≤ y...
Let f (x, y) = c, 0 ≤ y ≤ 4, y ≤ x ≤ y + 1,  be the joint pdf of X and Y. (a) (3 pts) Find c and sketch the region for which f (x, y) > 0. (b) (3 pts) Find fX(x), the marginal pdf of X. (c) (3 pts) Find fY(y), the marginal pdf of Y. (d) (3 pts) Find P(X ≤ 3 − Y). (e) (4 pts) E(X) and Var(X). (f) (4 pts) E(Y)...
Let f ( x , y ) = x^ 2 + y ^3 + sin ⁡...
Let f ( x , y ) = x^ 2 + y ^3 + sin ⁡ ( x ^2 + y ^3 ). Determine the line integral of f ( x , y ) with respect to arc length over the unit circle centered at the origin (0, 0).
Let f(x,y) be a scalar function, and let F(x,y,z) be a vector field. Only one of...
Let f(x,y) be a scalar function, and let F(x,y,z) be a vector field. Only one of the following expressions is meaningful. Which one? a) grad f x div F b) div(curl(grad f)) c) div(div F) d) curl(div(grad f)) e) grad(curl F)
2 Let F be a field and let R = F[x, y] be the ring of...
2 Let F be a field and let R = F[x, y] be the ring of polynomials in two variables with coefficients in F. (a) Prove that ev(0,0) : F[x, y] → F p(x, y) → p(0, 0) is a surjective ring homomorphism. (b) Prove that ker ev(0,0) is equal to the ideal (x, y) = {xr(x, y) + ys(x, y) | r,s ∈ F[x, y]} (c) Use the first isomorphism theorem to prove that (x, y) ⊆ F[x, y]...
Problem 16.8 Let X and Y be compact metric spaces and let f: X → Y...
Problem 16.8 Let X and Y be compact metric spaces and let f: X → Y be a continuous onto map with the property that f-1[{y}] is connected for every y∈Y. Show that ifY is connected then so isX.
Let the joint pmf of X and Y be defined by f (x, y) = c(x...
Let the joint pmf of X and Y be defined by f (x, y) = c(x + y), x =0, 1, 2, y = 0, 1, with y ≤ x. 1. Are X and Y independent or dependent? Why or why not? 2. Find g(x | y) and draw a figure depicting the conditional pmfs for y =0 and 1. 3. Find h(y | x) and draw a figure depicting the conditional pmfs for x = 0, 1 and2. 4....
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT