Account
Register

Share

Books Shortlist

# Solution - If a and b are any two non-zero and non-collinear vectors then prove that any vector r coplanar with a and b can be uniquely expressed as r=t1a+t2b , where t1 and t2 are scalars - Vectors - Collinearity and Coplanarity of Vectors

#### Question

If bar a and bar b are any two non-zero and non-collinear vectors then prove that any vector bar r  coplanar with  bar a and bar b can be uniquely expressed as bar r=t_1bara+t_2barb , where  t_1 and t_2  are scalars

#### Solution

You need to to view the solution
Is there an error in this question or solution?

#### APPEARS IN

2012-2013 (March)
Question 2.2.3 | 4 marks
Solution for question: If a and b are any two non-zero and non-collinear vectors then prove that any vector r coplanar with a and b can be uniquely expressed as r=t1a+t2b , where t1 and t2 are scalars concept: Vectors - Collinearity and Coplanarity of Vectors. For the courses HSC Arts, HSC Science (Computer Science), HSC Science (Electronics), HSC Science (General)
S