Find component of vector A along the direction of B A-B and in perpendicular direction of B -A- B- A-B - 5- -A-B - -A-B - -5- -A-B - -

The correct option is C A||B = 5; So component of A along direction of B is A cos120^∘ = A sin 30 = 5 [ ∵ cos(90 + θ) = sinθ] Here we can see if just mea ...

You visited us 1 times! Enjoying our articles? Unlock Full Access!

Byju's Answer

Standard XII

Physics

Vector Component

Find componen...

Question

Find component of vector $\to A$ along the direction of $\to B$ A||B and in perpendicular direction of $\to B$ $A ⊥ B$ .

A||B = 5;

No worries! We‘ve got your back. Try BYJU‘S free classes today!

A||B =

No worries! We‘ve got your back. Try BYJU‘S free classes today!

A||B = -5;

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

A||B =

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Open in App

Solution

The correct option is C
A||B = -5;

So component of A along direction of B is $A c o s 120^{\circ} = - A s i n 30 = - 5$

$[∵ c o s (90 + θ) = - s i n θ]$

Here we can see if just measure the shadow you will get a $c o s 60 = \frac{a}{2} = 5$

But since this 5 is in the opposite direction of vector B so we say that the component of A along the

direction B is -5.

Now component in the perpendicular direction of B is

$A s i n (120^{\circ}) = A c o s 30 = 5 \sqrt{3}$

$[∵ s i n (90 + θ) = c o s θ]$

Just the shadow measurement is a cos $30^{\circ}$ and it's in the perpendicular direction, so no need to

change sign.

So component along the direction is always $a c o s θ$ and in perpendicular direction is $a s i n θ$ . This will take care of sign so don't worry.

Suggest Corrections

Similar questions

Find component of vector $\to A$ along the direction of $\to B$ A||B and in perpendicular direction of $\to B$ $A ⊥ B$ .

Find component of vector $\to A$ along the direction of $\to B$ i.e. A||B and in perpendicular direction of $\to B$ that is $A_{⊥_{B}}$ .

Find the component of vector $\to A$ along the direction of $\to B (A_{| | B})$ and in the perpendicular direction of $\to B (A_{⊥ B})$ .

Find the component of vector $\to A$ along the direction of $\to B$ i.e. $(A_{| | B})$ and in perpendicular direction of $\to B$ that is $(A_{⊥ B})$ .

Two vectors are presented as $a = 3.0 i + 5.0 j$ and $b = 2.0 i + 4.0 j$ . Find $(a \times b), (a \cdot b), (a + b) \cdot b$ and the component of $a$ along the direction of $b$ .

Join BYJU'S Learning Program

Find component of vector →A along the direction of →B A||B and in perpendicular direction of →B A⊥B.

Find component of vector $\to A$ along the direction of $\to B$ A||B and in perpendicular direction of $\to B$ $A ⊥ B$ .