hashmarks
SSS is enough to show congruence.
Angle "A" is congruent to Angle "D"
Show that, if you have two triangles, two of the sides and the angle in between are congruent.
__ - __ AC = XZ = is the similar sign
hashmarks
A single slash perpendicular to the line is used to show it is congruent. In other words, if two segments are congruent they would both have a single slash through them, but if you have multiple pairs, each separate pair would have its own unique number of slashes (1,2,3...).
To show it just make ticks marks. Like one tick mark for all of the sides that are congruent to this measurement. Then two tick marks for all of the sides that are the next measurement and congruent.
Since I can't attach illustrations here (can I?), I can describe one. If two congruent and parallel triangles have vertices joined by line segments, the line segments described will mark the boundaries of a solid.
Because Corresponding Parts of Congruent Triangles, there are five ways to prove that two triangles are congruent. Show that all sides are congruent. (SSS) Show that two sides and their common angle are congruent. (SAS) Show that two angles and their common side are congruent. (ASA) Show that two angles and one of the non common sides are congruent. (AAS) Show that the hypotenuse and one leg of a right triangle are congruent. (HL)
Yes, the titles of TV shows should be italicized or put in quotation marks. Quotation marks are commonly used when writing titles of episodes or individual segments within a TV show.
the symbol for congruent is ~ with _ in the same space. (US keyboard does not have a congruent key
SSS is enough to show congruence.
It depends on the length of the ads, and how many segments per show, but there are 8 minutes of commercials in a half hour show
In a triangle, if two sides show to be congruent, you would use the reflexive property of congruence. (AB=AC) A /\ / \ / \ B C As shown in this diagram AB and AC obviously show to be parallel(as shown by the slash marks...
sss
No, because they need not be congruent.