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its differnt each time but thers only two that look differnt so pick the two thats look weirder then the other ones for me its c and d
What else can I help you with?
Which of these triangles appears to be congruentto any others shown here?
which pairs of triangles appear to be congruent
The triangles shown below must be congruent.?
True
What must be shown to be congruent in order to say that the triangles are congruent by SAS?
Two sides and the included angle of one triangle must be congruent to two sides and the included angle of the other.
Which is the correct congruence statement for the triangles shown?
edr
What is the type of congruence between the triangles shown?
side- angle- side
Which of these triangles appears to be congruentto any others shown here?
which pairs of triangles appear to be congruent
The triangles shown below must be congruent.?
True
Why would you use CPCTC?
Once you have shown that two triangles are congruent you can use CPCTC (corresponding parts of congruent triangles are congruent) to show the congruence of the remaining sides and angles.
Which correspondence accurately describes the two congruent triangles shown here?
Abe cbd
What must be shown to be congruent in order to say that the triangles are congruent by SAS?
Two sides and the included angle of one triangle must be congruent to two sides and the included angle of the other.
Two congruent triangles are drawn with geometry software. Determine whether the transformation shown is a translation. Answer yes or no?
yes
A student draws two congruent triangles with geometry software. Determine whether the transformation shown is a rotation. Answer yes or no?
yes
what- Gwyn is making a mosaic and she begins by tilting the three triangles shown in the diagram. she wants to know if these triangular tiles are congruent?
angle- side- angle postulate
Two triangles are shown. Which statement is true?
answer
what- for the triangles shown?
~ lzg
Which is the correct congruence statement for the triangles shown?
edr
How do you prove that the diagonals in a rhombus divide the rhombus into four congruent triangles?
The proof is fairly long but relatively straightforward. You may find it easier to follow if you have a diagram: unfortunately, the support for graphics on this browser are hopelessly inadequate.Suppose you have a rhombus ABCD so that AB = BC = CD = DA. Also AB DC and AD BC.Suppose the diagonals of the rhombus meet at P.Now AB DC and BD is an intercept. Then angle ABD = angle BDC.Also, in triangle ABD, AB = AD. therefore angle ABD = angle ADC.while in triangle BCD, BC = CD so that angle DBC = angle BDC.Similarly, it can be shown that angle BAC = angle CAD = angle DCA = angle ACB.Now consider triangles ABP and CBP. angle ABP (ABD) = angle CBP ( CBD or DBC),sides AB = BCand angle BAP (BAC) = angle BCP (BCA = ACB).Therefore, by SAS, the two triangles are congruent.In the same way, triangles BCP and CPD can be shown to congruent as can triangles CPD and DPA. That is, all four triangles are congruent.
