PING OUT "Let Vector V = 36 i + 24 j - 57 k"

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To find the angles that vector V = 36i + 24j - 57k makes with the x, y, and z axes, one can utilize the dot product. The unit vectors i, j, and k represent the x, y, and z components respectively, with i being parallel to the x-axis. The angle between vector V and the x-axis can be determined using the formula involving the dot product of V and the unit vector i. The discussion emphasizes the importance of understanding these components and their relationships to calculate the angles accurately. Clarifying the use of unit vectors is crucial for solving the problem effectively.
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how to do this problem:
Let vector V = 36 i + 24 j - 57 k. What angles does this vector make with the x, y, and z axes?

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What do you think ? Any ideas ?
 
Do you know what the dot product (scalar product) is?
 
Yea, I know what they are...but aren't they for when you have 2 vectors?
 
What makes you think you haven't two vectors at your disposal?
 
Can you expand on it more? The problem only gave me one.
 
Well, does there exist, for example, a vector which is parallell to the x-axis, so that you could use this in calculating angle between the given vector and the x-axis?
 
Could you show me an example? (maybe find the angle a 3-d vector (doesnt have to be mine) makes with the x-axis?)
 
What's "i" in your equation?
What does this symbol stand for?
 
  • #10
i is the x-component, j is the y-com, and k is the z-com.
 
  • #11
physicsss said:
Could you show me an example? (maybe find the angle a 3-d vector (doesnt have to be mine) makes with the x-axis?)

how about the X axis?
 
  • #12
physicsss said:
i is the x-component, j is the y-com, and k is the z-com.
Your vector is:
\vec{V}=36\vec{i}+24\vec{j}-57\vec{k}
\vec{i} is a unit vector PARALLELL to the x-axis, the number multiplied with it is the vector's component along the x-axis (that is, the vector's x-component).
Another way of saying this, is that:
\vec{V}\cdot\vec{i}=36
Are you now able to calculate the angle?
 
  • #13
I just began learning dot products, and I have never done such an operation like this...
 
  • #14
physicssss,
i denotes a unit "vector" along x-axis
j denotes a unit "vector" along y-axis
k denotes a unit "vector" along z-axis

if u find angle of x with i , then with j and then with k ...
what will u have eventually?

-- AI
 
  • #15
what is x in this case? I'm really confused...
 
  • #16
physicsssssss, TenaliRaman blundered, his sentence should read:
"if u find angle of V with i , then with j and then with k ...
what will u have eventually?"
Does this clear up?
 
  • #17
not really...is there a formula for finding the angles a vector makes with the axes??
 
  • #18
But the i-vector lies along the x-axis!
So the angle between the vector V and the x-axis must be the same as the angle between i-vector and V
 

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