SOLUTION: What property proves that if a is greater than -b, and -b is greater than c, that a is greater than c?
Algebra.Com
Question 458650: What property proves that if a is greater than -b, and -b is greater than c, that a is greater than c?
Answer by robertb(5830) (Show Source): You can put this solution on YOUR website!
Transitive property of inequality.
RELATED QUESTIONS
If B is 30% greater than A, and C is 80% greater than A, by what percent is C
greater... (answered by richwmiller)
1. You roll two dice. What is the probability that you roll
(a) doubles?
(b) a... (answered by stanbon)
1. You roll two dice. What is the probability that you roll
(a) doubles?
(b) a... (answered by solver91311)
if a,b,c are three distinct real numbers in geometric progression and a+b+c=xb then prove (answered by KMST)
What is the domain for y=logbase2(3x-6)?
Is it :
a)x is greater than 0
b)x is greater... (answered by oscargut)
For a standardised normal distribution, what is the probability that z is
a) greater... (answered by Edwin McCravy)
If 9 less than the product of a number and -4 is greater than 7, which could be that... (answered by Seutip)
Given standardized normal distribution(with a mean of 0 and a standard deviation of 1)... (answered by Boreal)
Readings on a thermometer are normally distributed with a mean of 0C° and a standard... (answered by Boreal)