In a particular winter day, the maximum and minimum temperatures are -5 degree C and 10 degree C. If the base temperature is 15 degree C, find out the appropriate formula for calculating the heating degree-days from the list and calculate heating degree-days accordingly.
In a particular winter day, the maximum and minimum temperatures are -5 degree C and 10...
5. Find the absolute maximum and absolute minimum values of the function f(x) = x.elfm) on the interval --2 < < 2. J 17 J 3.1.
6. Find the particular part of the solution of the difference equation y(n+2) – 2y(n+1)+y(n) = 4 for n <0.
Find the minimum and the maximum values of |z2 + (p + 1)i| on the closed disc {z ∈ C : |z| ≤ q + 1} Find the minimum and the maximum values of 122 + (p + 1)i| on the closed disc {z € C: |Z| <q+1}.
07: The weekly demand for propane gas (in 1000's of gallons) from a particular facility is a f(x) = 2 (1-x2) 1<x<2 a. Compute expected weekly demand by showing details and explain this quantity. b. What is the proportion of weekly demand within one standard deviation? c. Find the median amount of weekly demand for propane gas.
In this chapter, we introduced a number of general properties of systems. In particular, a system may or may not be (1) Memoryless (2) Time invariant (3) Linear (4) Causal (S) Stable Determine which of these properties hold and which do not hold for each of the following continuous-time systems. Justify your answers. In each example, y(t) denotes the system output and x(t) is the system input. (b) y(t) [cos(31)]x(1) (c) y() = 13, x(T)dT x(t) + x(t - 2...
Please answer a,b,c,d Consider a hypergeometric probability distribution with n=3, R=5, and N = 10. a) Calculate P(x = 0). b) Calculate P(x > 1). c) Calculate P(x<3). d) Calculate the mean and standard deviation of this distribution. a) P(x = 0) = (Round to four decimal places as needed.)
Consider the following minimum problem: Minimize: C = 22 Subject to the constraints: 1 +5:03 > 10 -621 +5x2 > 3 X>0 22 > 0 Write the dual problem for the above minimum problem by selecting the appropriate number for each blank box shown below (Do not solve the dual problem). P= (Select) Y1+ (Select) Y2 [ Select) Y1+ (Select) Y2 50 (Select) Yi+ 10 Y2 <1 yı >0; 92 > 0
4. The following 2 isomers are reacted with HBr, first at low temperatures (<-20°C) and then again at elevated temperatures (>50°C). H,CO CHE CH, HCYCH, сн. a) Draw the most stable allylic cation that would form during the reaction for each isomer. b) Draw the reaction for each condition for each isomer (4 altogether), and provide the expected major product in each case. c) The following reaction coordinate can correspond to only the reactions of one of the isomers provided....
in C++ 6. (20)The Fibonacci sequence is the series of integers 0, 1, 1,2, 3, 5, 8, 13, 21, 34, 55, 89.. 1 See the pattern? Each element in the series is the sum of the preceding two items. There is a recursive formula for calculating the nth number of the sequence (the oth number if Fib(0)-0): 8 Fib(N)-/N, if N 0 or 1 ifN> 1 Fib(N-2) Fib(N-1), a. b. c. Write a recursive version of the function Fibonacci. Write...
1. f(x) c (2xA2xA3sin(x)) and -1<x<1 a. find c b. find E(x) 2. I define El-log(p(x) as entropy. Based on this formula, explain if the entropy of a broken glass is higher or an unbroken glass. 3. f(x) c(3x2 1) and -1<x<1 a. find c b. find E(x) c. find Var(x)