Vector Addition and Subtraction for Homework Help

  • Thread starter Thread starter EmmaB03
  • Start date Start date
  • Tags Tags
    Drawing Vectors
AI Thread Summary
To solve vector addition and subtraction problems, first sketch the vector sum C = A + B by placing the tail of vector B at the head of vector A, then draw a new vector from the origin to the head of B. For the vector difference D = A - B, reverse the direction of vector B and repeat the process. The vector E = -A - B can be found by reversing both vectors A and B and then adding them. For the difference F = B - A, place the tail of A at the head of B and draw the resulting vector. Breaking vectors into their (x,y) components is also a valid method for performing these operations.
EmmaB03

Homework Statement


[/B]
For the vectors A and B (shown in the figure attached), carefully sketch:

- The vector sum C = A + B
- The vector difference D = A - B
- The vector E = -A - B
- The vector difference F = B - A

Homework Equations



Please explain how to do this.

The Attempt at a Solution



Don't know what to do :(
 

Attachments

  • 887d627da29341aa8870cbcaf6218a94_A.jpeg
    887d627da29341aa8870cbcaf6218a94_A.jpeg
    9.8 KB · Views: 525
Physics news on Phys.org
When adding two vectors, keep the first one in place, and then put the tail of the second at the head of the first. Then you can draw from the origin to where that second vector's head is, and that's your new vector. Do the same for subtracting, but reverse the direction of the one you're subtracting.

You can also break the vectors up into their (x,y) components and add/subtract those, giving you the (x,y) components for your new vector.
 
Thread 'Variable mass system : water sprayed into a moving container'

Thread 'Variable mass system : water sprayed into a moving container'

Starting with the mass considerations #m(t)# is mass of water #M_{c}# mass of container and #M(t)# mass of total system $$M(t) = M_{C} + m(t)$$ $$\Rightarrow \frac{dM(t)}{dt} = \frac{dm(t)}{dt}$$ $$P_i = Mv + u \, dm$$ $$P_f = (M + dm)(v + dv)$$ $$\Delta P = M \, dv + (v - u) \, dm$$ $$F = \frac{dP}{dt} = M \frac{dv}{dt} + (v - u) \frac{dm}{dt}$$ $$F = u \frac{dm}{dt} = \rho A u^2$$ from conservation of momentum , the cannon recoils with the same force which it applies. $$\quad \frac{dm}{dt}...
View full post »

Similar threads

Writing a vector parallel and normal to a unit vector ##\hat n##
Replies
26
Views
1K
The derivative of the dot product "distributes" over each vector
Replies
5
Views
699
Correct Setup for Finite Difference to Calculate Quantum Tunneling
Replies
2
Views
926
Handling two SHMs in different directions
Replies
18
Views
913
Vector problem -- Find the angle between vector A and vector B
Replies
8
Views
2K
Vector Subtract Given Magnitude
Replies
6
Views
2K
What's the use of unit vectors?
Replies
3
Views
2K
How do you graph vectors on a graph paper using their magnitude and direction?
Replies
5
Views
2K
How to Calculate the Bird's Net Displacement Using Vector Addition?
Replies
3
Views
1K
How do you find the third vector C in vector addition problems?
Replies
2
Views
2K

Hot Threads

Recent Insights

Back
Top