Question

The pint of intersection of the lines 3x + 2y + 5 = 0 and 3x - 4y + 6 = 0 is

Answer 1

Answer:

jdjdjdiwowoworueiowwoeijdd djieieoer jeididifi ek

Answer 2

Step-by-step explanation:

Search for questions, posts and chapters

Maths

Bookmark

The equation of the line passing the point of intersection of the lines 3x + 2y + 4 = 0, 2x + 5y -1 = 0 and whose distance from the point (2,-1) is 2 is

share

Share

Answer

Line passing through point of intersecting of L

1

,L

2

is given by L

1

+λ

2

=0

⇒(3x+2y+4)+λ(2x+5y−1)=0

⇒x(3+2λ)+y(2+5λ)+4−λ=0

Distance of (2,−1) to this line,

∣

∣

∣

∣

∣

∣

(3+2λ)

2

+(2+5λ)

2

2(3+2λ)−(2+5λ)+4−λ

∣

∣

∣

∣

∣

∣

=2

⇒6+4λ−2−5λ=2

29λ

2

+32λ+13

⇒−2λ+8=2

29λ

2

+32λ+13

⇒λ

2

+16−8d=29λ

2

+32λ+13

⇒28λ

2

+40λ−3=0⇒28λ

2

+42λ−2λ−3=0

14λ(2λ+3)−(2λ+3)=0

(14λ−1)(2λ+3)=0⇒λ=

14

1

or λ=

2

−3

L:x(3+

7

1

)+y(2+

14

5

)+4−

14

1

=0

44x+33y+55=0⇒

4x+3y+5=0

or x(3−3)+y(2−

2

15

)+4+

2

3

=0

⇒y(−11)

Search for questions, posts and chapters

Maths

Bookmark

The equation of the line passing the point of intersection of the lines 3x + 2y + 4 = 0, 2x + 5y -1 = 0 and whose distance from the point (2,-1) is 2 is

share

Share

Answer

Line passing through point of intersecting of L

1

,L

2

is given by L

1

+λ

2

=0

⇒(3x+2y+4)+λ(2x+5y−1)=0

⇒x(3+2λ)+y(2+5λ)+4−λ=0

Distance of (2,−1) to this line,

∣

∣

∣

∣

∣

∣

(3+2λ)

2

+(2+5λ)

2

2(3+2λ)−(2+5λ)+4−λ

∣

∣

∣

∣

∣

∣

=2

⇒6+4λ−2−5λ=2

29λ

2

+32λ+13

⇒−2λ+8=2

29λ

2

+32λ+13

⇒λ

2

+16−8d=29λ

2

+32λ+13

⇒28λ

2

+40λ−3=0⇒28λ

2

+42λ−2λ−3=0

14λ(2λ+3)−(2λ+3)=0

(14λ−1)(2λ+3)=0⇒λ=

14

1

or λ=

2

−3

L:x(3+

7

1

)+y(2+

14

5

)+4−

14

1

=0

44x+33y+55=0⇒

4x+3y+5=0

or x(3−3)+y(2−

2

15

)+4+

2

3

=0

⇒y(−11)+11=0⇒

y=1