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Vector Components. Day #1 Vector Sheet C Day #2 Vector Sheet D & E {skip 3 dimensional problems}. HW: Vector Sheet C, #1 – 9. Vector Sheet D, #1 – 6, Vector Sheet E, #4 – 7. Physics Unit 2: Vectors Vector Components Review Problem: Vectors: Find the total displacement of...
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Vector Components Day #1 Vector Sheet C Day #2 Vector Sheet D & E {skip 3 dimensional problems}
HW: Vector Sheet C, #1 – 9. Vector Sheet D, #1 – 6, Vector Sheet E, #4 – 7.
Physics Unit 2: Vectors Vector Components Review Problem: Vectors: Find the total displacement of... Vector A: 116 km 34.0°SE Vector B: 182 km 16.5°ES N E 34.0° W a A = 116 km 140.5° total 34.0° 90.0° R = Resultant 16.5° B = 182 km S
Solve for the length of the resultant with the law of cosines. Next use law of sines to solve for a. Finally add 34.0o to a for the direction.
What math processes would be required if we added another vector to these two vectors? And again? At some point, it will be much easier to break vectors into parts, called components, and then analyze it that way.
Addition of Vector using the Component Method: Adding vectors is the same as adding the components.
Component • ____________________ Method of Vector Addition: • This is another way to represent a vector: to use coordinates rather than length and angle. Method Give the position of the x and y coordinates of the tip of the vector, n.b. the angular brackets are used to show the coordinates of the tip of the vector, rather than just an ordered pair of numbers.
components The ____________________ of a vector are the projection of the vector onto the coordinate axes. The lengths of the components are the same as the (x, y) coordinates of the tip of the vector. For the vector shown at right, the length of the projection of the vector on the horizontal axis. the length of the projection of the vector on the vertical axis. the coordinates of the tip of the vector.
vectors The components of a vector can also be treated at _____________ , and the vector can be thought of as the sum of its components. the coordinates of the tip of the vector.
Example #1: For the vectors shown at right, which vector is drawn to correctly match the components? NO NO YES YES NO YES
II. Converting components into magnitude and direction and vice versa: SOH CAH TOA! Very Important Skills on this slide!
Example #2: A force of 155 Newtons acts at an angle of 37.0° above the horizontal. What are the horizontal and vertical components of the force. Fy F q Fx SOH CAH TOA!
Example #3: Tiger Woods hits a golf ball 165 km/h 40.0° above the horizontal. Find the component velocities of the ball vertical 165 km/h Vy 40.0o horizontal Vx
Example #4: An airplane is flying 525 mi/h 24.5° E of N. After 2.50 h, what are the Northern and Eastern displacements? North or +y 525 mi/h 24.5° East or +x
Example #5: Show the value of the components of vectors that act horizontally or vertically. Be careful about the + or – sign! +y A +x B +y +x
+y C +x +y +x D
IV. Addition of Vector using the Component Method: Adding vectors is the same as adding the components.
Example #6: What is the sum of the following two displacements? Omit: This is review
Example #7: Find the displacement: 122 km 37.0° NE, 175 km 17.5° WS Draw the two vectors, with each starting at the origin. N SOH CAH TOA! A =122 km 37.0o W E B=175 km 17.5o S
Calculate the components of the vectors: X Components Y Components We still need to find magnitude and direction for this vector.
N W E S
Example #8: To be on schedule a pilot needs to arrive at airport in 5.00 hours. The airport is located 1500 km 40.0° NW of her present location. If the wind averages 70.0 km/h from the southwest, where should she aim and how fast should she fly? SOH CAH TOA! unknown Wind is from the southwest, so towards the northeast. The angle is 45.0o. N wind = 70.0 km/h 45.0° R = Desired velocity = 300 km/h 40.0° P = pilot should fly W E S
Calculate the components of the vectors: X Components Y Components Sadly, we are not done yet… We still need to find magnitude and direction for this vector.
N W E S
Finally the big moment... adding vectors using the component method! Example #9: Find the total force: (1) A = 18.0 N 33.0° NE (2) B = 16.0 N 28.0° NW (3) C = 7.00 N 12.0° WS (a) First make a diagram N or +y B A 28.0° 33.0° W E or +x 12.0° C S
(b) now find all the x and y components and add them together separately: (1) A = 18.0 N 33.0° NE (2) B = 16.0 N 28.0° NW (3) C = 7.00 N 12.0° WS
The resultant (sum) vector is the sum of the vectors. The components of the sum vector (R) equals the sum of the corresponding components. (c) Now find the magnitude of the resultant : (d) finally find the direction Ry R q Rx
Homework. Use a straightedge and sketch a vector.. Calculate the value of Ax and Ay. SOH CAH TOA!