If veca and vecb are two given vectors a...

If `veca and vecb` are two given vectors and k is any scalar,then find the vector `vecr` satisfying `vecr xx veca +k vecr=vecb`.

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To solve the equation \( \vec{r} \times \vec{a} + k \vec{r} = \vec{b} \), we will follow these steps: ### Step 1: Rearranging the Equation We start with the given equation: \[ \vec{r} \times \vec{a} + k \vec{r} = \vec{b} \] Rearranging gives: ...

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STATEMENT-1 : If veca and vecb be two given non zero vectors then any vector vecr coplanar with veca and vecb can be represented as vecr=xveca+yvecb where x &yare some scalars. STATEMENT-2 : If veca,vecbvecc are three non-coplanar vectors, then any vector vecr in space can be expressed as vecr=xveca+yvecb+zvecc , where x,y,z are some scalars. STATEMENT-3 : If vectors veca & vecb represent two sides of a triangle, then lambda(veca+vecb) (where lambda ne 1 ) can represent the vector along third side.

If veca and vecb are mutually perpendicular unit vectors, vecr is a vector satisfying vecr.veca =0, vecr.vecb=1 and (vecr veca vecb)=1 , then vecr is:

If veca,vecb and vecc are non coplnar and non zero vectors and vecr is any vector in space then [vecc vecr vecb]veca+[veca vecr vecc] vecb+[vecb vecr veca]c= (A) [veca vecb vecc] (B) [veca vecb vecc]vecr (C) vecr/([veca vecb vecc]) (D) vecr.(veca+vecb+vecc)

If veca,vecb and vecc are three non coplanar vectors and vecr is any vector in space, then (vecxxvecb),(vecrxxvecc)+(vecb xxvecc)xx(vecrxxveca)+(veccxxveca)xx(vecrxxvecb)= (A) [veca vecb vecc] (B) 2[veca vecb vecc]vecr (C) 3[veca vecb vecc]vecr (D) 4[veca vecb vecc]vecr

If veca,vecb and vecc are three non coplanar vectors and vecr is any vector in space, then (vecaxxvecb),(vecrxxvecc)+(vecb xxvecc)xx(vecrxxveca)+(veccxxveca)xx(vecrxxvecb)=

CENGAGE ENGLISH-DIFFERENT PRODUCTS OF VECTORS AND THEIR GEOMETRICAL APPLICATIONS -Multiple correct answers type

If veca and vecb are two given vectors and k is any scalar,then find t...
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