1. For each of the following, write F as a Cartesian vector (F-F, i+ F j+F...
Part A Express the force as a Cartesian vector. (Figure 1) Express your answer in terms of the unit vectors i, j and k. To denote vectors in your answers, be sure to select the 'vec button Figure < 1of1 > Submit F-900 N 4 m Provide Feedback Next >
A. Express F1 as a Cartesian vector. B. Express F2 as a Cartesian vector. C. Express F3 as a Cartesian vector. F1-15 kN 40° F2- 26 kN 13 12 30° F3-36 kN
1) (30 pts) A Force is given with F= BC kN in the figure below. According to this configuration, please; a) write the force in Cartesian vector form, b) write unit vector of AB in Cartesian vector form, c) find magnitude of the projected component of the force Facting along the axis AB of pipe. d) determine the projected component of the force Facting along the axis AB of pipe in Cartesian vector form. B 4 m 6 m 3...
1. The Cartesian coordinates representation of a vector is (65 cm/s, 32 cm/s), the polar coordinates of this vector are: Select one: a. (72 cm/s, 26 degrees) b. (52 cm/s, 63 degrees) c. (45 cm/s, 15 degrees) d. (26 cm/s, 72 degrees) 2. Which of the following correctly expresses the vector 29 m at 29 degrees in unit vector notation Select one: a. (15 i + 43 j) m b. (25 i + 14 j) m c. (14 i +...
[1] The screw is subjected to the four forces shown. Express each force in Cartesian vector form and then determine the resultant force. Find the magnitude and direction angles of the resultant force. F1-400 N F-150N 600 120 45° Fs-250 N 45 60- F:-600 N
2.6 Addition and Subtraction of Cartesian Vectors Solution Checking: Fi 100N F-F+A 354+(-354(8600N' tb) Unit vector acting in the direction of F (35.4/100)i (35.4/100)j -0.354i -0.354j + 0.866k (86.6/100)k 2.6 Addition and Subtraction of Cartesian Vectors Solution a1 cos (0.354) 69.30 B1 cos-0.354) 111° Y1 cos(0.866) 30.0° Using the same method, F,-(10G+ 184-2 12k)kN ь.ms
Express the force as a Cartesian vector. (Figure 1) Express your answer in terms of the unit vectors i, j and k. 2 F = 50 lbr 45° 5
why is this wrong for vectors vector<char> decrypt{ {'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K', 'L', 'M', 'N', 'O', 'P', 'Q', 'R', 'S', 'T', 'U', 'V', 'W', 'X', 'Y', 'Z', '1', '2', '3', '4', '5', '6', '7', '8', '9', 'A'}, {'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K', 'L', 'M', 'N', 'O', 'P', 'Q', 'R', 'S', 'T', 'U', 'V', 'W', 'X', 'Y', 'Z', '1', '2', '3', '4', '5', '6', '7', '8', '9', 'A', 'B'}, }; for(int...
1) Name each of the following organic compounds: (a-b-c-e-f-g-j-k-I-m-n) a) CH3CH2CH2CH3 j) CH3CHBOCHBrCH3 b) CH3CH2CH2C(CH3)3 c) CH2=CHCH2CH2CH3 d) CH3CHCICH(CH3)2 k) CH2BrCH(CH3)CHCICH2CH3 1) CH2CH(OH)CH(CH3)2 m) (CH3)2CHCHO n) CH3CH2CH2COCH3 e) (CH3)2C(OH)CH2CH3 f) CH3CHO o) (CH3)2CHCOOH p) CH3CH2CN g) CH3CH2COCH2CH3 h) CH3CH2COOH 9) CH3CHBCH(OH)CH3 i) CH3CH(OH)CH2CHO r) CH3COCH(CH3)CHBCH3
RBH 11.28] Problem 5: A vector force field F is defined in Cartesian Coordinates by y's F Fo 'xy2 + a3 e*y/a2 j+ey/ak a Use Stokes' Theorem to calculate: F.dr L where L is the perimeter of the rectangle ABCD given by A = (0,1, 0), B = (1,1,0), C = (1,3, 0) and D = (0,3,0) RBH 11.28] Problem 5: A vector force field F is defined in Cartesian Coordinates by y's F Fo 'xy2 + a3 e*y/a2 j+ey/ak...