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What else can I help you with?
How do you draw and right angle DEF?
We are not here to do your homework for you.
How do you draw a triangle DEF that angle F measures 90 degrees?
It will be a right angle triangle with a 90 degree angle and 2 acute angles
Triangle def is a right triangle if fe equals 24 and de equals 7 find df?
We can * Assume that 24 is the hypotenuse - the side opposite the right angle - then * 72 + df2 = 242 * Or 49 + df2 = 576 which leads us to df2 = 527 which leads to df = 22.956 Or we can * Assume that df is the hypotenuse - the side opposite the right angle - then * 72 + 242 = df2 * Or 49 + 576 = df2 which leads to 625 which leads to df = 25 As 25 is a whole number it is most likely the answer to the problem, but the other answer is equally valud, given the data presented.
If ABC def and the scale factor from ABC to def is what are the lengths of and respectively?
4,8,12
what is the scale factor from ABC to DEF?
Answer: Since you are looking for the scale factor of ABC to DEF the answer is 8 because DEF is 8 times larger than ABC.
What is another name for def?
Right angle E
What is another name for right angle DEF?
Oh honey, that's an easy one. Another name for a right angle DEF is a 90-degree angle. It's like the perfect L shape, straight up and down, no funny business. So, go ahead and call it a 90-degree angle or a right angle, whatever floats your boat.
How do you draw and right angle DEF?
We are not here to do your homework for you.
What is right angle DEF?
It is an angle measuring 90 degrees.
How do you draw a triangle DEF that angle F measures 90 degrees?
It will be a right angle triangle with a 90 degree angle and 2 acute angles
What describe an angle with a vertex at E?
FED and DEF lol
What is another name for the great plains?
wheat belt def.
What are congruence theorems and postulates?
If the sides AB, BC and CA of triangle ABC correspond to the sides DE, EF and FD of triangle DEF, then the two triangles are congruent if:AB = DE, BC = EF and CA = FD (SSS)AB = DE, BC = EF and angle ABC = angle DEF (SAS)AB = DE, angle ABC = angle DEF, angle BCA = angle EFD (ASA)If the triangles are right angled at A and D so that BC and EF are hypotenuses, then the triangles are congruent ifBC = EF and AB = DE (RHS)BC = EF and angle ABC = angle DEF (RHA).
What is the vertex of the angle DEF?
The letter E would be at the vertex. The two lines enclosing the angle E would be ED and EF. Usually, to make it quite clear we would call angle E by the description "angle DEF or angle FED (they are the same angle).
Is ABC DEF If so name the congruence postulate that applies.?
Yes, triangles ABC and DEF are congruent if all corresponding sides and angles are equal. The congruence postulate that applies in this case could be the Side-Angle-Side (SAS) postulate, which states that if two sides and the included angle of one triangle are equal to two sides and the included angle of another triangle, then the triangles are congruent. Other applicable postulates include Side-Side-Side (SSS) and Angle-Angle-Side (AAS), depending on the known measurements.
Which angle in DEF has the largest measure?
NO.
Can a right angle labeled def also be called fed?
Yes, as long as the label for the vertex stays in the middle, you can read it in any direction you want.
