Question

Part 1: Provide a system of TWO equations in slope-intercept form, with only one solution. Using complete sentences, explain why this system has one solution.

Part 2: Provide a system of TWO equations in slope-intercept form with no solutions. Using complete sentences, explain why this system has no solutions.

Part 3: Provide a system of TWO equations in slope-intercept form with infinitely many solutions. Using complete sentences, explain why this system has infinitely many solutions.

Answer 1

answer chocies

Answer 2

There aren't any :/

Answer 3

are u doing algebra

Answer 4

Haha yesss. Algebra 1.

Answer 5

Can you help me with this? do you know itt?

Answer 6

hang on i have a Algebra book

Answer 7

Okay :)

Answer 8

do u have to pick one of those

Answer 9

Noo all. :/

Answer 10

i past Algebra but wat are u doing

Answer 11

wit n a+

Answer 12

what do you mean what am i doing? im trying to solve this....

Answer 13

u half to explain the soultion using complete sentences

Answer 14

Ik that..

Answer 15

make two equations using complete sentences

Answer 16

make a math problem but put it in sentences

Answer 17

thanks for trying to help. Im going to go now though.! byee

Answer 18

for two lines to be intersecting, their slopes should NOT BE EQUAL
they can be perpendicular!
so, consider two lines in slope-intercept form
\[l_1\equiv y=x+b_1\\
l_2\equiv y=-x+b_2\]
let the two lines intersect at some common point (1,2)
solving for b1, and b2:
\[2=1+b_1\implies b_1=1\\
2=-1+b_2\implies b_2=3\]
so the two intersecting lines are :
\[y=x+1\\
y=-x+3\]

Answer 19

kapeesh?

Answer 20

Ohhh thanks :) and whats kapeesh??

Answer 21

http://www.urbandictionary.com/define.php?term=kapeesh

Answer 22

Yes, me kapeesh hahaha.!