A : The distance between the straight lines `2x-y+3=0, y=2x+4` is `1//sqrt(5)`.
R : Distance between parallel lines `ax+by+c_(1)=0, ax+by+c_(2)=0` is `(|c_(1)-c_(2)|)/(sqrt(a^(2)+b^(2)))`.

The distance between the parallel lines 2x-y+3=0, 2x-y-4=0 is

Prove that distance between two parallel lines ax+by+c_(1)=0 and ax+by+c_(2)=0 is given by (|c_(1)-c_(2)|)/(sqrt(a^(2)+b^(2)))

Distance between the parallel lines ax + by +c_1 = 0 and ax + by + c_2 = 0 is

Distance between the parallel lines ax + by +c_1 = 0 and ax + by + c_2 = 0 is

Distance between the parallel lines ax + by +c_1 = 0 and ax + by + c_2 = 0 is

Assertion : The distance between the straight lines y=mx+c_(1),y=mx+c_(2) is |c_(1)-c_(2)|impliesm=0 Reason : The distance between parallel lines ax+by+c_(1)=0,ax+by+c_(2)=0 is (|c_(1)-c_(2)|)/(sqrt(a^(2)+b^(2))) Then the correct answer

Prove that distance between two parallel lines ax+by+c_1=0 and ax+by+c_2=0 is given by |c_1-c_2|/(sqrt(a^2+b^2))

Show that the distance between the parallel lines ax+by+c=0 and k(ax+by)+d=0 is |(c-(d)/(k))/(sqrt(a^(2)+b^(2)))|

Show that the distance between the parallel lines ax+by+c=0 and k(ax+by)+d=0 is |(c-(d)/(k))/(sqrt(a^(2)+b^(2)))|

Consider the following statements : 1. The distance between the lines y=mx+c_(1) and y=mx+c_(2) is (|c_(1)-c_(2)|)/sqrt(1-m^(2)) . 2. The distance between the lines ax+by+c_(1) and ax+by+c_(2)=0 is (|c_(1)-c_(2)|)/sqrt(a^(2)+b^(2)) . 3. The distance between the lines x=c_(1) and x=c_(2) is |c_(1)-c_(2)| . Which of the above statements are correct ?