Question 1 (2 points) For this question, you do not have to calculate anything to find...
Question 5 (5 points) You are given a function y = 2x2 + 1. If Ax = dx = 0.01, find the value of dy for x = 2. (Do NOT round your final answer; exact values only)
Question 9 2 pts You are given lim f(x) = L and a tolerance ε. Find a number 8 such that (x)-1|< < whenever 0 <br-al<o x-a lim 8x = 32; a = 0.01 X-4 O 0.04 0.01 O 0.00125 O 0.08
QUESTION 2 - 1 POINT Find the intersection points of the parabola y = -0? - 2 and the line-x+y= 4. Give your answer as two ordered pairs separated by a comma. For example, if you found that the solutions were (1,2) and (3, 4) you would enter (1,2), (3,4).
Question 2 (5 Points):: Two labs are to be utilized to decide if a patient has a certain disease or not. For each lab, the patient gives a binary response: positive/negative. All the possible probabilities for diseased and healthy patients are given below. Labs Result P Both labs are positive Lab A is positive and Lab B is negative Lab A is negative and Lab B is positive Both labs are negative robability for diseased (P1) Probability for healthy (P2)...
Question 3 Not complete Points out of 1.00 As part of a promotion for a new type of cracker, free samples are offered to shoppers in a local supermarket. The probability that a shopper will buy a packet of crackers after tasting the free sample is 0.200. Different shoppers can be regarded as independent trials. Let p be the proportion of the next n shoppers that buy a packet of the crackers after tasting a free sample. How large should...
(1 point) Do the following for the points (-3,1), (-2,2),(-1,1), (1,-2), (3,-2): (If you are entering decimal approximations, enter at least five decimal places (a) Find the equation for the best-fitting parabolay.2 +ba c for these points: y0.0139x*2-0.6887x-0.209 (b) Find the equation for the best-fitting parabola with no constant term y2b for these points: (c) Find the equation for the best-fitting parabola with no linear term yc for these points: 0.414xA2-0.6805x Ch5.2b Least Squares and Curve Fitting: Problem 5 Previous...
QUESTION 1 2 points Save Answer You have a device that wants to transmit many packets to a router, which is sometimes busy serving other users. At every second, your device attempts to send a packet. It succeeds with probability 1/5 and the success of any attempt is independent of the success of other attempts. Let N be the number of attempts until the first success. What type of random variable is N? Bernoulli Binomial Geometric O Poisson QUESTION 2...
Hint you would do this by Gaussian Elimination on: [1 0 11 001 | 1 2 1 0 1 0 li 1 210 0 1] Question No. 5 [-1 2 -1] (1 O 11 Given that the matrix A = 0 -1 1 and its inverse matrix, is A = 2 111 [2-2 1 [2 2 1 Find the equation of the plane through the three points: (-1,2, -1), (0, -1, 1) and (2,-2, 1). Hint: Note the plane takes...
(15 points) Find the derivative of the following functions. You do not have to simplify answers. ecos (22+2+1) 1. (5 points) f(x) = 2. (5 points) g(x) = So" con (+0+1)dt + So sin tdt 3. (5 points) h(x) = Licen (o? +++ 1)dt
Question 1 (2 points) ✓ Saved The base of a solid, s, is the region enclosed by the graph of y = 2 - 22 and the coordinate axes. If all plane cross sections perpendicular to the y-axis are squares, then the volume of S is given by Question 2 (2 points) The region enclosed by the graph of y = 1 and y=sin(x) from X = 0 to x = is rotated about about the x-axis. What is the...