Sorry it’s blurry!!
$1408. 9:17 AM
$1408. 9:17 AM
Phys 1408 cal based
Phys 1408 cal based
A jogging track has a length of 1408 yards (yd). How long is this in miles (mi)? First fill in the blank on the left with one of the ratios. Then write the answer 5280 ft 12 in Ratios: 1 mi 5280 ft 1760 yd 1 mi 1 mi 1760 yd 1 mi 12 in 1 ft 1408 yd Imi
(c) please
Tz that 1. Find the most general linear fractional transformation w = maps the region A into B : (a) A = {l-1 <1}, B = {Im w >0} (6) A = {lz| <1}, B= {Rew >0} (c) A = {]z – al < R}, B = {Rew 5-3}
1. Ten teams Ti, Tz, ..., Tio are playing in a basketball tournament. In the first round, the teams are randomly assigned to games 1, 2, 3, 4, and 5 (a) Describe an appropriate sample space. (b) Describe the intended probability function (c) What is the probability that team Ti will play either team T or team Ts in the first round? d) What is the probability that team T and team T2 will not play each other in the...
-1/3 (i) Find the third-degree Maclaurin polynomial Tz(x) for f(x)= (1+4x). You can use differentiation or derive the polynomial using binomial series. (ii) Find approximation errors|f(x)– Tz(x) at x =0.1 and x=1.
4. Let X1, X, be two r.v.'s with m.g.f. given by M(t1, tz)=[] (en+2 +1)+] (e? +e?)]”, t1, tz € R. Calculate E(X1), oʻ(X,) and C(X1, X2), provided they are finite.
let 5, (4) = (as and to and tz = kit Ice [ (deket al compule W [Z, Fz] (4) yl what conditions make Yi and yz linearly independent on a, b, cydre-sent ( what conditions on CAI make and tz linearly indeperdert?
topology
Problem 1. (1) Suppose Ti and Tz are two different topologies on a set X. When is the identity map id X X given by id(r) (2) Show that the subspace topology Ty is the smallest topology on YcX for which the inclusion : Y+X is a continuous map. = ra continuous map from (X, Ti) to (X, T2)?