A community for students.
Here's the question you clicked on:
 0 viewing
anonymous
 one year ago
What is the reason for statement 1 in the proof below?
Prove –c + a + c = a.
Chart with two columns and three rows. The first column is labeled Statement and the second column is labeled Reason. First column row one  negative c plus a plus c equals negative c plus c plus a. Second column row one is blank. First column row two  equals zero plus a. Second column row two  Additive Inverse Property. First column row three  equals a. Second column row three  Identify Property for Addition
A.
Associative Property of Addition
B.
Definition of Subtracti
anonymous
 one year ago
What is the reason for statement 1 in the proof below? Prove –c + a + c = a. Chart with two columns and three rows. The first column is labeled Statement and the second column is labeled Reason. First column row one  negative c plus a plus c equals negative c plus c plus a. Second column row one is blank. First column row two  equals zero plus a. Second column row two  Additive Inverse Property. First column row three  equals a. Second column row three  Identify Property for Addition A. Associative Property of Addition B. Definition of Subtracti

This Question is Closed

anonymous
 one year ago
Best ResponseYou've already chosen the best response.0C. Commutative Property of Addition D. Distributive Property

anonymous
 one year ago
Best ResponseYou've already chosen the best response.0What do you think it is?

anonymous
 one year ago
Best ResponseYou've already chosen the best response.0I think the answer is C. http://foothilltech.org/dperez/algebra1/star/starreviewlesson2.pdf
Ask your own question
Sign UpFind more explanations on OpenStudy
Your question is ready. Sign up for free to start getting answers.
spraguer
(Moderator)
5
→ View Detailed Profile
is replying to Can someone tell me what button the professor is hitting...
23
 Teamwork 19 Teammate
 Problem Solving 19 Hero
 Engagement 19 Mad Hatter
 You have blocked this person.
 ✔ You're a fan Checking fan status...
Thanks for being so helpful in mathematics. If you are getting quality help, make sure you spread the word about OpenStudy.