Busy. Please wait.
or

show password
Forgot Password?

Don't have an account?  Sign up 
or

Username is available taken
show password

why

Make sure to remember your password. If you forget it there is no way for StudyStack to send you a reset link. You would need to create a new account.

By signing up, I agree to StudyStack's Terms of Service and Privacy Policy.


Already a StudyStack user? Log In

Reset Password
Enter the associated with your account, and we'll email you a link to reset your password.

Remove ads
Don't know
Know
remaining cards
Save
0:01
To flip the current card, click it or press the Spacebar key.  To move the current card to one of the three colored boxes, click on the box.  You may also press the UP ARROW key to move the card to the "Know" box, the DOWN ARROW key to move the card to the "Don't know" box, or the RIGHT ARROW key to move the card to the Remaining box.  You may also click on the card displayed in any of the three boxes to bring that card back to the center.

Pass complete!

"Know" box contains:
Time elapsed:
Retries:
restart all cards




share
Embed Code - If you would like this activity on your web page, copy the script below and paste it into your web page.

  Normal Size     Small Size show me how

Geometry Test

QuestionAnswer
If a=b, then a+c=b+c Addition property of equality
If a=b, then a-c=b-c Subtraction property of equality
If a=b, then ac=bc Multiplication property of equality
A=a Reflexive property of equality
If a=b, then b=a Symmetric property of equality
If a=b and b=c, then a=c Transitive property of equality
If a=b, then b can be substituted for a in any expression Substitution property of equality
If 3x=15,then x=5 Division property of equality
If AB=CD, then AB+MN=CD+MN Addition property of equality
If x+5=12, then x=7 Subtraction property of equality
If m<1=m<2, then 5(m<1)=5(m<2) Multiplication property of equality
If d=LW and L=4, then a=4W Substitution property of equality
If 7=x, then x=7 Symmetric property of equality
If m<A=<B, and <B=<C then <A=<C Transitive property of congruency
If two angles form a linear pair, then they are supplementary linear pair theorem
Vertical angles are congruent vertical angle theorem
All right angles are congruent Right angle congruence theorem
If two angles are supplementary to the same angle or two to congruent angles then the two angles are congruent congruent supplements them
if two angles are complementary to the same angle or to two congruent angles than the two angles are congruent Congruent complements theorm
Created by: Wallaby