1.29. Let G be the set of points zeC satisfying either z is real and -2...
2. Let a be a positive real number, let r be a real number satisfying r >1, let N be an integer greater than one, and let tR -R be the integrable simple function defined such that tr,N(r) = 0 whenver x < a or z > ar*, tr,N(a) = a-2 and tr,N(z) = (ar)-2 whenever arj-ıく < ar] for some integer j satisfying 1 < j < N. Determine the value of JR trN(x) dz.
1. Let D be the collection of points in IR3 satisfying what is the "highest" (greatest value of z) point in this set? 1. Let D be the collection of points in IR3 satisfying what is the "highest" (greatest value of z) point in this set?
5) Let P(1,2,2) be a point, and f(x,y,z) and g(x,y,z) be two differentiable functions satisfying the following conditions. 1) f(P)=1 and g(P)=4 og IT) = -2 Oz IP III) The direction in which f increases most rapidly at the point Pis ū=4i - +8k , and the derivative in this direction is 3. IV) Equation of the plane tangent to the surface f(x,y,z)+3g(x,y,z)=13 at the int P is x+4y + 5z =19 According to this, calculate og Ox . (20P)
(16 points total) Let g(t) = (2-sin t)2, (a) (4 points) Find a rational function f(z) such that f(e)) 5. t (Hint: Let z = eit and express cost and sint in terms of z) b) (3 points) Find and classify all the isolated singularities of the function f(2) in part We were unable to transcribe this image
i want all this answer in the complex number ili-Let f be entire and If (2)l s Izl2 for all sufficiently large values of Izl>To.Prove that f must be a polynomial of degree at most2. ii-Classify the zeros of f(z)cos ( iii-Find Residue of g at points of singularity,g(z) = cotrz. -Find the radius of convergence of Σ-o oo (z-2i)n 1 Tl f(z)sinz ili-Let f be entire and If (2)l s Izl2 for all sufficiently large values of Izl>To.Prove that...
7. (10 points) Let Sym(Z) = \f : Z Z : f bijective) be the set of bijective functions from Z to Z. (Sym(Z),o) is a group, where o denotes the composition of functions. Let g: Z Z be the function 8(n) = {-1 nodd n+1 neven (a) Prove that g € Sym(Z). (b) Find the order of g. Heat: gog - composition of functions
1. (10 points) Let T:P3 → P3 be the linear transformation satisfying T(x2 - 1) = x2 + x-3, T(2x) = 4x, and T(3x + 2) = 2(x + 3). Determine T(ax? + bx + c), where a, b, and c are arbitrary real numbers.
1. (10 points) Let T:P3 → P3 be the linear transformation satisfying T(x2 - 1) = x² + x - 3, T(2x) = 4x, and T(3x + 2) = 2(x + 3). Determine T(ax+ bx + c), where a, b, and c are arbitrary real numbers.
2. Let X be a continuous random variable. Let R be the set of all real numbers, let Z be the set of all integers, and let Q be the set of all rational numbers. Please calculate (1) P(X ? R), (2) P(X ? Z), and (3) P(X EQ)
3. (10 Points, part III) Consider the Sturm-Liouville differential equation where the coefficients p(z), q(z), and σ(z) are real and continous on la, b , and p(2) and σ(z) are strictly positive for all a,b (a) Derive the Rayleigh quotient λ from (2). b) What does this quotient describe? Give two examples of applications for this formula. (c) what are the neces,ary conditions for λ > 0 to be satisfied? (d) Recall that the minimum value of the Rayleigh quotient...