![If a,b,c determine the vertices of a triangle, show that ½[bxc+cxa+axb] gives the vector area of the triangle. Hence deduce the condition that the three points a,b,c are collinear. Also find the If a,b,c determine the vertices of a triangle, show that ½[bxc+cxa+axb] gives the vector area of the triangle. Hence deduce the condition that the three points a,b,c are collinear. Also find the](https://cdn1.byjus.com/wp-content/uploads/2020/04/ncert-exemplar-solutions-class-12-mathematics-chapter-10-46.png)
If a,b,c determine the vertices of a triangle, show that ½[bxc+cxa+axb] gives the vector area of the triangle. Hence deduce the condition that the three points a,b,c are collinear. Also find the
![Statement 1: If vec ua n d vec v are unit vectors inclined at an angle alphaa n d vec x is a unit vector bisecting the angle between them, then vec Statement 1: If vec ua n d vec v are unit vectors inclined at an angle alphaa n d vec x is a unit vector bisecting the angle between them, then vec](https://d10lpgp6xz60nq.cloudfront.net/web-thumb/645833560_web.png)
Statement 1: If vec ua n d vec v are unit vectors inclined at an angle alphaa n d vec x is a unit vector bisecting the angle between them, then vec
![SOLVED: Show all of your work and answers in the space provided (5 pts) Given points A(1,0, 2),B(3,-1,6),and C(5,7,4) Find the midpoint between points A and € b) Find the distance between SOLVED: Show all of your work and answers in the space provided (5 pts) Given points A(1,0, 2),B(3,-1,6),and C(5,7,4) Find the midpoint between points A and € b) Find the distance between](https://cdn.numerade.com/ask_images/085259592cfa4cb4ba7d67b9702aebd5.jpg)
SOLVED: Show all of your work and answers in the space provided (5 pts) Given points A(1,0, 2),B(3,-1,6),and C(5,7,4) Find the midpoint between points A and € b) Find the distance between
If vector a,b,c are three vectors such that vector a.b=a.c and axb=axc,a≠0,then show that vector b=c. - Sarthaks eConnect | Largest Online Education Community
![Find a unit vector perpendicular to the plane ABC, where the points A, B, C are (3, - 1, 2), (1, - 1, - 3) and (4, - 3, 1) respectively. Find a unit vector perpendicular to the plane ABC, where the points A, B, C are (3, - 1, 2), (1, - 1, - 3) and (4, - 3, 1) respectively.](https://haygot.s3.amazonaws.com/questions/1540325_1707311_ans_a804f9e75590446cbc41588609260520.jpeg)
Find a unit vector perpendicular to the plane ABC, where the points A, B, C are (3, - 1, 2), (1, - 1, - 3) and (4, - 3, 1) respectively.
![a) Define vector product (b) Understand the properties of vector product (c)Find the area of parallelogram. - ppt download a) Define vector product (b) Understand the properties of vector product (c)Find the area of parallelogram. - ppt download](https://images.slideplayer.com/34/10220331/slides/slide_22.jpg)
a) Define vector product (b) Understand the properties of vector product (c)Find the area of parallelogram. - ppt download
![Let A,B and C be the unit vectors . Suppose that A.B=A.C =0 and the angle between B and C is (pi)/(6) then prove that A = +-2(BxxC) Let A,B and C be the unit vectors . Suppose that A.B=A.C =0 and the angle between B and C is (pi)/(6) then prove that A = +-2(BxxC)](https://d10lpgp6xz60nq.cloudfront.net/web-thumb/643180761_web.png)
Let A,B and C be the unit vectors . Suppose that A.B=A.C =0 and the angle between B and C is (pi)/(6) then prove that A = +-2(BxxC)
![SOLVED: Q1. Given the points A : (0,0,2) , B : (3,0,2). €C : (1,2,1). and D : (2,1,4). Find the CTOSS product U = AB X Ac . Find the equation SOLVED: Q1. Given the points A : (0,0,2) , B : (3,0,2). €C : (1,2,1). and D : (2,1,4). Find the CTOSS product U = AB X Ac . Find the equation](https://cdn.numerade.com/ask_images/3c2527dc76504b6ca44908e5ea5fbdec.jpg)
SOLVED: Q1. Given the points A : (0,0,2) , B : (3,0,2). €C : (1,2,1). and D : (2,1,4). Find the CTOSS product U = AB X Ac . Find the equation
![SOLVED: Points A, B and C have coordinates (7,3, 5) , (8,1,14) and (5,3,1) respectively: Find the vector product AB x AC. Click 33 select 3 Rows and 1 Column, and click SOLVED: Points A, B and C have coordinates (7,3, 5) , (8,1,14) and (5,3,1) respectively: Find the vector product AB x AC. Click 33 select 3 Rows and 1 Column, and click](https://cdn.numerade.com/ask_images/cf3391a0b5bd43f9a8dda571192b260c.jpg)
SOLVED: Points A, B and C have coordinates (7,3, 5) , (8,1,14) and (5,3,1) respectively: Find the vector product AB x AC. Click 33 select 3 Rows and 1 Column, and click
If A, B, and C are vector such that vector|B| = vector|C|. Prove that vector[(A + B) x (A + C)] x (B x C) . (B + C) = vector 0. -
![i) The sides AB and BC of the triangle ABC are represented by the vectors `2hati-hatj+ 2hatk`... - YouTube i) The sides AB and BC of the triangle ABC are represented by the vectors `2hati-hatj+ 2hatk`... - YouTube](https://i.ytimg.com/vi/6TQKqjZfw7E/maxresdefault.jpg)
i) The sides AB and BC of the triangle ABC are represented by the vectors `2hati-hatj+ 2hatk`... - YouTube
![If the three vectors A, B and C satisfy the relation A· B = 0 and A· C = 0 , then vector A is parallel to If the three vectors A, B and C satisfy the relation A· B = 0 and A· C = 0 , then vector A is parallel to](https://i.ytimg.com/vi/BvsjSXIHE5Q/maxresdefault.jpg)