3. Show that (a) the function g: R” → R, given by g(x) = ||2||2, is...
2) (12) f:R-(3/2)-R-10, (x) 1/(3 2x) g:R--21->R-1o), g (x)1/ (x 2) h:R-(-4/3]-R-(1/3), h(x) (f o g) (x) Verify if h(x) is one to one and onto. If it is, find the inverse function of h(x).
2) (12) f:R-(3/2)-R-10, (x) 1/(3 2x) g:R--21->R-1o), g (x)1/ (x 2) h:R-(-4/3]-R-(1/3), h(x) (f o g) (x) Verify if h(x) is one to one and onto. If it is, find the inverse function of h(x).
3. Let fRR' and g:R R2 be given by a) Write down the derivative matrices g'(u) and f(r) and use the chain rule to find the derivative matrix (g fy (x) b) Are the entries of the new function(go f),(x) a linear or nonlinear function of z? mark 3 marks c) How do you understand the statement "(D() is a linear function" in Section 4.1 of the Class Notes?
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1. In class we showed that the function f : R → R given by (if>o 0 if a S0 was smooth (but not real analytic). Note that f(x) approaches a horizontal asymptote (y = 1) as a goes to positive infinity. (a) Show that f(x)+f(1-2)メ0 for all x E R, so that g : R → R given by g(x)- 70 is also a smooth function. (b) Prove that if 0 ifx-1. (c) Note...
what I need for is #2!
#1 is attached for #2.
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1. In class we showed that the function f : R → R given by (if>o 0 if a S0 was smooth (but not real analytic). Note that f(x) approaches a horizontal asymptote (y = 1) as a goes to positive infinity. (a) Show that f(x)+f(1-2)メ0 for all x E R, so that g : R → R given by g(x)- 70 is also a...
Warm-Up: Subgradients & More (15 pts) 1. Recall that a function f:R" + R is convex if for all 2, Y ER" and le (0,1), \f (2) + (1 - 1)f(y) = f(2x + (1 - 1)y). Using this definition, show that (a) f(3) = wfi (2) is a convex function for x ER" whenever fi: R → R is a convex function and w > 0 (b) f(x) = f1(x) + f2(2) is a convex function for x ER"...
Monotone mappings. A function R R" is called monotone if for all r, y dom, (Note that 'monotone, as defined here is not the same as the definition given in $3.6.1. Both definitions are widely used.) Suppose f : R" R is a differentiable convex function Show that its gradient Vf is monotone. Is the converse true, i.e., is every monotone mapping the gradient of a convex function?
Monotone mappings. A function R R" is called monotone if for all...
2. [1 mark] Calculate the limit of the vector valued function f: ACRY-R lim G logy) 3. Consider the function :R? - R. given by Flv = 0 if if (,y) (0,0): (x,y) -(0,0) (a) (1 mark] State the definition of continuity of a function at the point. (1 mark] Then calculating the limit (by any technique of your choice) show that f is continuous at (0,0). (b) [2 marks] Find the partial derivatives and at (x,y) + (0,0). and...
Monotone mappings. A function u : Rn Rn is called monotone if for all x, y є dom v, Note that monotone' as defined here is not the same as the definition given in 83.6.1. Both definitions are widely used.) Suppose f R"- R is a differentiable convex function. Show that its gradient ▽f is monotone. Is the converse true. i.e., 1s every monotone mapping the gradient of a convex function?
Monotone mappings. A function u : Rn Rn is...
Let f: R -R and g : R → Rbe some functions, and let x be a vector in R . Suppose that all the components off and g are directionally differentiable at x, and that g is such that, for all w RM, y +az) - g(y) y, w Then the composite function F(x)-g(f(x)) is directionally differentiable at x and the following chain rule holds: F, (x,d)=g'(f(x);f,(x,d)), YdER".
Let f: R -R and g : R → Rbe some...
5. (a) Show that if the functions f and g are log-convex, f+g is also log-convex. Give a counter example to show that this is not true for log-concave functions (Hint: log(f +g)log(elogf +elogs). Show that this is convex by the second-order test for convexity.) (Hint: Use the definition of log-convex functions.) (Note: Harmonic mean of a,b is defined as T^T.) b) Suppose f is convex, g is non-decreasing and log-convex. Show that h(x) g(f(x)) is log-convex. (c) Show that...