Question Time If the derivative f'(x) is negative, decreasing, concave up Then the function f(x) is not all info may be used): increasing, concave up decreasing, concave up decreasing, concave down increasing, concave down Points possible: 1 This is attempt 1 of 1. Submit O

number 51 Calculating derivatives53 ,59,63 thank u 45. y = e' cscx 46. y = 1 + tan w tant 47. y = 48. y cotx 1 + csc X 1 1 + sec1 49. y = 50. y = csc- 1 x sec z csc z 51. y = x - cos x sin x 52-54. Verifying derivative formulas Verify the following derivativ formulas using the Quotient Rule. d d 52. (cot x) ) = -csc?x 53. (sec x) = sec x tan x dx dx 54. d (csc x) = -csc x cotx dx wave? 57-64. Second derivatives Find y for the following functions. 58. y = = x2 cos x 57. y = x sinx 60. y - Ecco ecos x 59. y = etsin x 62. y = tan x 61. y = cotx 64. y = cos e sine 63. y = = sec X CSC X fallina etata

1.The Longest Common Subsequence Problem implement the Longest Common Subsequence (LCS) problem using dynamic programming. Input: two DNA sequences Adenine (A), Guanine (G), Cytosine (C) and Thymine (T) Output: the Longest Common Subsequence (LCS) of the input sequences Test data example) S1=ACCGGTCGAGTGCGCGGAAGCCGGCCGAA S2=GTCGTTCGGAATGCCGTTGCTCTGTAAA S3=GTCGTCGGAAGCCGGCCGAA programming language is c or java

Shelly and Kelly Macdonald met up with Sarah and Tara MacNeill to go fishing in Cape Breton. They found two pools in a stream containing speckled trout (assume equal variance), with the Macdonalds at one pool and the MacNeills at the other, and at the end of the day each team had caught (and released unharmed) 5 fish. For each fish they recorded the length and weight, and the data on length (in cm) is summarized below (Give the answers to 2 places past decimal) Team Macdonald MacNeill Mean 18.1 20.35 Std.Dev 1.4 1.9 a.) To test whether or not the fish have the same mean size in the two pools, the null hypothesis will be: HO: 1-X 2 = -2.25 HO: p1-y2 = -2.25 HO: X 1-8 2 = 0 HO: 1-2 = 0 # Tries 0/1 b.) The alternative hypothesis for this test will be: Ha: * 1- 2 = -2.25 Ha: p1-12 + -2.25 Ha: 81-X 2 = 0 Ha: p1-42 = 0 1236 Tries 0/1 c.) What is the pooled estimate of the variance? 1202 Tries 0/5 d.) Compute the value of the test statistic. 1 Tries 0/5

A 50-g weight is hung at the 20-cm mark of a meterstick and a 100-g weight is hung at the 70-cm mark. At what point must the meterstick be supported for it to be in rotational equilibrium? The weight of the meterstick is negligible. O at the 56.67-cm mark. at the 46.67 cm mark. O at the 53.33-cm mark. O at the 43.33 cm mark.

Part A The post is made of Douglas fir and has a diameter of 100 mm (Figure 1) It is subjected to the load of 20 kN and the soil provides a frictional resistance distributed around the post that is triangular along its sides that is, it varies from w=0 kN/mat y=0 m to w= 15 kN/m at y = 2 m. Neglect the weight of the post Determine the force at its bottom needed for equilibrium Express your answer to three significant figures and include appropriate units. HÅ ? Value Units Submit Request Answer Figure 1 of 1 Part B 20KN What is the displacement of the top of the post with respect to a bottom B? Express your answer to three significant figures and include appropriato unito, ? 2 m 0 = Value Units 12 kN/m Submit Request Answer

a hockey puck moving at 7.0 m/s coasts to a halt in 75m on a smooth ice surface. What is the coefficient of friction between the ice and the puck?