find the area of a parallelogram whose d...

find the area of a parallelogram whose diagonals are `veca=3hati+hatj-2hatk and vecb=hati-3hatj+4hatk`.

Text Solution

Verified by Experts

The correct Answer is:

`7/2(hat(i)+hat(j)), -1/2 (hat(i)-hat(j))`

Component along the vector `hat(i)+hat(j)`
`=(A cos theta) hat(B)=((vec(A).vec(B)))/B^(2) vec(B)=((3hat(i)+4hat(j)).(hati+hatj))/((sqrt(2))^(2))(hat(i)+hat(j))`
`=(3+4)/2(hat(i)+hat(j))=7/2(hat(i)+hat(j))`
Component along the velocity `hat(i)-hat(j)`
`=(A cos theta) hat(B)=((vec(A).vec(B)))/B^(2)vec(B)=((3hati+4hatj).(hati-hatj)(hati-hatj))/((sqrt(2))^(2))`
`=((3-4))/2(hat(i)-hat(j))=-1/2(hat(i)-hat(j))`

Promotional Banner

Promotional Banner

Topper's Solved these Questions

BASIC MATHS
ALLEN|Exercise Exersice-4[B]|14 Videos
BASIC MATHS
ALLEN|Exercise EXERCISE-5(A)|15 Videos
BASIC MATHS
ALLEN|Exercise DATA SUFFICIENCY QUESTIONS|3 Videos
AIIMS 2019
ALLEN|Exercise PHYSICS|40 Videos
CIRCULAR MOTION
ALLEN|Exercise EXERCISE (J-A)|6 Videos

Similar Questions

Explore conceptually related problems

Area of a parallelogram, whose diagonals are 3hati+hatj-2hatk and hati-3hatj+4hatk will be:

Find the area of the prallelogram whose adjacent sides are veca=hati+2hatj+3hatk and vecb=3hati-2hatj+hatk .

Find the area of the parallelogram whose diagonals are represented by -2hati+4hatj+4hatk and -4hati-2hatk

Find the area of a parallelogram whose diagonals are determined by the vectors bara=3 hati +hatj -2 hatk and barb=hati-3hatj+4hatk

Angle between diagonals of a parallelogram whose side are represented by veca=2hati+hatj+hatk and vecb=hati-hatj-hatk

Find the area of the parallelogram having diagonals 2hati-hatj+hatk and 3hati+3hatj-hatk

The diagonals of as parallelogram are given by veca=3hati-4hatj-hatk and vecb=2hati+3hatj-6hatk Show that the parallelogram is as rhombus and determine the length of its sides.

Find the area of the parallelogram whose sides are represented by 2hati + 4hatj - 6hatk and hati +2hatk.

Vectors along the adjacent sides of parallelogram are veca = 2hati +4hatj -5hatk and vecb = hati + 2hatj +3hatk . Find the length of the longer diagonal of the parallelogram.

Vectors along the adjacent sides of parallelogram are veca = hati +2hatj +hatk and vecb = 2hati + 4hatj +hatk . Find the length of the longer diagonal of the parallelogram.

ALLEN-BASIC MATHS-Exercise-04 [A]

Two vectors vecA and vecB are such that vecA+vecB=vecC and A^(2)+B^(2)...
Text Solution
|
A vector perpendicular to (4hati-3hatj) may be :
Text Solution
|
find the area of a parallelogram whose diagonals are veca=3hati+hatj-2...
Text Solution
|
If vecA=2hati+4hatj and vecB=6hati+8hatj and A and B are the magnitude...
Text Solution
|
A force (3hati+2hatj) N displaces an object through a distance (2hati-...
Text Solution
|
A vector vecF(1) is along the positive X-axis. its vectors product wit...
Text Solution
|
If hati,hatj and hatk are unit vectors along X,Y & Z axis respectively...
Text Solution
|
Two vectors vecP and vecQ that are perpendicular to each other if :
Text Solution
|
The magnitude of the vectors product of two vectors vecA and vecB may ...
Text Solution
|
Which of the following statements is not true
Text Solution
|
The vector vecB=5hati+2hatj-Shatk is perpendicular to the vector vecA=...
Text Solution
|
A physical quantity which has a direction:-
Text Solution
|
Which of the following physical quantities is an axial vector ? (a) mo...
Text Solution
|
The minimum number of vectors of equal magnitude needed to produce zer...
Text Solution
|
How many minimum numbers of a coplanar vector having different magntid...
Text Solution
|
How many minimum numbers of a coplanar vector having different magntid...
Text Solution
|
What is the maximum number of components into which a vector can split...
Text Solution
|
The maximum number of components into which a vector can be resolved i...
Text Solution
|
What is the maximum number of components into which a vector can split...
Text Solution
|
The vector sum of the forces of 10 newton and 6 newton can be:
Text Solution
|