Let's prove the following theorem:

if the following are true:

then a ⋅ c < b ⋅ c

Given

1	a > b
2	c < 0

Proof Table

#	Claim	Reason
1	b ⋅ c > a ⋅ c	if c < 0 and a > b, then b ⋅ c > a ⋅ c (Inequality Change Pre)
2	a ⋅ c < b ⋅ c	if b ⋅ c > a ⋅ c, then a ⋅ c < b ⋅ c (Symmetric Inequality Property)

Previous Lesson Next Lesson

Please log in to add comments