Recent questions in Congruence

High school geometryAnswered question

Joglxym 2022-11-21

Use the Symmetric Property of Congruence to complete the statement: If__? $\cong $ __?, then $\mathrm{\angle}DEF\cong \mathrm{\angle}PQR$.

High school geometryAnswered question

Nola Aguilar 2022-11-21

Find all whole number solutions of the congruence equation. $(2x+1)\equiv 5mod4$

High school geometryAnswered question

Yaretzi Mcconnell 2022-11-16

Which triangle congruence theorem is most closely related to the Leg-Angle (LA) Congruence Theorem? Explain.

High school geometryAnswered question

Howard Nelson 2022-11-13

Name the property of equality or congruence that justifies going from the first statement to the second statement.

5x=20

x=4

5x=20

x=4

High school geometryAnswered question

kaltEvallwsr 2022-11-11

Write a proof for this theorem. Reflexive Property of Angle Congruence

High school geometryAnswered question

Jairo Decker 2022-10-29

Name the property of equality or congruence that justifies going from the first statement to the second statement.

3x+x+7=23

4x+7=23

3x+x+7=23

4x+7=23

High school geometryAnswered question

Diego Barr 2022-10-24

There is only one whole number solution between 0 and 11 of the congruence equation $$({x}^{2}+3x+7)\equiv 2mod11$$. Find the solution.

High school geometryAnswered question

Bodonimhk 2022-10-20

Find the smallest nonnegative integer that sasfied congruence $$y\equiv 41(mod4)$$

High school geometryAnswered question

omgespit9q 2022-10-20

Write a proof for each theorem. Transitive Property of Angle Congruence

High school geometryAnswered question

Christopher Saunders 2022-10-17

Translate this congruence statement into English sentence $$\overline{TO}\cong \overline{BE}$$.

High school geometryAnswered question

Kamden Larson 2022-10-16

For each of the following congruences, find all integers N, with N > 1, that make the congruence true. $$a.23\equiv 13(modN).b.10\equiv 5(modN).c.6\equiv 60(modN).d.23\equiv 22(modN).$$

High school geometryAnswered question

Winston Todd 2022-10-14

Determine whether the congruence is true or false.

$$14\equiv 24mod4$$

$$14\equiv 24mod4$$

High school geometryAnswered question

Marilyn Cameron 2022-10-13

Explain why there is no Addition Property of Congruence.

High school geometryAnswered question

limfne2c 2022-10-11

Use the property to copy and complete the statement. Reflexive Property of congruence: ? $$\cong \overline{SE}$$

High school geometryAnswered question

Cohen Ritter 2022-10-11

Determine whether the congruence is true or false.

$$11\equiv 15mod4$$

$$11\equiv 15mod4$$

High school geometryAnswered question

daniko883y 2022-10-06

Name the corresponding parts in the pair of congruent triangles. Then complete the congruence statement. $$\mathrm{\u25b3}NPQ\cong \mathrm{\u25b3}DEF;\mathrm{\u25b3}EFD\cong $$ ___

High school geometryAnswered question

Russell Marsh 2022-09-30

Use a congruence modulo 9 to find the missing digit, indicated by a question mark: 89, 878*58,965=5299? 56270.

High school geometryAnswered question

Dana Russo 2022-09-09

The concepts of similarity and congruence apply only to triangles. A. True, B. False.

High school geometryAnswered question

abelynybco 2022-09-07

Which triangle congruence theorem is most closely related to the Hypotenuse-Leg (HL) Congruence Theorem? Explain.

High school geometryOpen question

temeljil4l 2022-08-20

Suppose that a and b are integers, $a\equiv 11\left(b\text{mod}19\right),\text{}{\textstyle \phantom{\rule{1em}{0ex}}}\text{and}{\textstyle \phantom{\rule{1em}{0ex}}}\text{}b\equiv 3\left(b\text{mod}19\right)$ . Find the integer c with $0\le c\le 18$ such that $c\equiv 13a\left(b\text{mod}19\right)$

Those high school students who had a difficult time with their Geometry studies might remember the pains of solving a congruence equation. If you have to do it for your design or Architecture course, you should not worry because we have the list of questions that have been posted by students like you along with the answers to help you see how this aspect of Geometry works.

It only seems complex upon the surface, yet once you get some practice and find solutions like the ones listed below, you will be able to implement Geometry skills for your course.