Math, asked by srayson2005, 6 months ago

P is the point (a, a-2) and Q is the point (4-3a, -a).
A.) Find the gradient of the line PQ.

B.) Find the gradient of a line perpendicular to PQ.

C.) Given that the distance PQ is 10√5, find the two possible values of a
Please show your work.

Answers

Answered by amitnrw
1

Given :    P is the point (a, a-2) and Q is the point (4-3a, -a).

distance PQ is 10√5,

To Find : A.) Find the gradient of the line PQ.

B.) Find the gradient of a line perpendicular to PQ.

C.) Given that the distance PQ is 10√5, find the two possible values of a

Solution:

P ( a , a - 2)  , Q ( 4 - 3a , - a)

Gradient = Slope =   (-a - (a - 2) ) / ( 4 - 3a - a)

= (2 - 2a) / (4 - 4a)

= (2 - 2a)/ 2(2 - 2a)

= 1/2

Gradient PQ = 1/2

gradient of a line perpendicular to PQ.  = m

=> m * 1/2 = - 1

=> m = - 2

gradient of a line perpendicular to PQ.   = - 2

distance PQ is 10√5

P ( a , a - 2)  , Q ( 4 - 3a , - a)

=> (4 - 3a - a)²  + ( -a - (a - 2))²  = (10√5)²

=> (4 - 4a)²  + (2-2a)²  = 500

=> 16(1 - a)² + 4(1-a)² = 500

=> 20(1 - a)² = 500

=> (1 - a)² = 25

=> 1 - a  = ± 5

=> a = 6  , a  = - 4

Possible values of a  are -4 & 6

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