Please, answer with explanation . In a convex quadrilateral ABCD, there are given ||AD|| = 7(√6 – √2), ||CD|| =13, ||BC|| = 15, C = arccos; 33, and D = 7+ + arccos 3. The other angles of the565'413quadrilateral and ||AB|| are required.Show that in any triangle ABC we haveb²+c².a. 1 + cos A cos(B − C)=4R²b. (b²+ c²=a²) tan A = 4S;b+csin(+c).C.=2c cos sin(A+B)'Bd.p = r (cot / + cot 2/1 + cot C2);2Be. cot+cot+cot=?.2Let ABCD be a tetrahedron. We consider the trihedral angles which haveas edges [AB, [AE, [AD, [BA, [BC, [BD, [CA, [CB, [CD, [DA, [DB, [DC. Show thatthe intersection of the interiors of these 4 trihedral angles coincides withthe interior of tetrahedron [ABCD].If Sn is the area of the regular polygon with n sides, find:S3, S4, S6, S8, S12, S20 in relation to R, the radius of the circle inscribed in thepolygon.

note : As per our company guidelines we are supposed to answer ?️only the first question. Kindly…

. In a convex quadrilateral ABCD, there are given ||AD|| = 7(√6 – √2), ||CD|| = 33 5 $³3³, and D = 7+ arccos + arccos. The other angles of the 13 13, ||BC|| = 15, C = arccos- quadrilateral and ||AB|| are required.

. In a convex quadrilateral ABCD, there are given ||AD|| = 7(√6 – √2), ||CD|| = 33 5 $³3³, and D = 7+ arccos + arccos. The other angles of the 13 13, ||BC|| = 15, C = arccos- quadrilateral and ||AB|| are required.

Elementary Geometry For College Students, 7e

7th Edition

ISBN:9781337614085

Author:Alexander, Daniel C.; Koeberlein, Geralyn M.

Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.

Chapter6: Circles

Section6.3: Line And Segment Relationships In The Circle

Problem 39E: The center of a circle of radius 2 in. is at a distance of 10 in. from the center of a circle of...

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Question

Please, answer with explanation

. In a convex quadrilateral ABCD, there are given ||AD|| = 7(√6 – √2), ||CD|| =
13, ||BC|| = 15, C = arccos; 33, and D = 7+ + arccos 3. The other angles of the
5
65'
4
13
quadrilateral and ||AB|| are required.
Show that in any triangle ABC we have
b²+c².
a. 1 + cos A cos(B − C)
=
4R²
b. (b²+ c²=a²) tan A = 4S;
b+c
sin(+c).
C.
=
2c cos sin(A+B)'
B
d.
p = r (cot / + cot 2/1 + cot C2);
2
B
e. cot+cot+cot=?.
2
Let ABCD be a tetrahedron. We consider the trihedral angles which have
as edges [AB, [AE, [AD, [BA, [BC, [BD, [CA, [CB, [CD, [DA, [DB, [DC. Show that
the intersection of the interiors of these 4 trihedral angles coincides with
the interior of tetrahedron [ABCD].
If Sn is the area of the regular polygon with n sides, find:
S3, S4, S6, S8, S12, S20 in relation to R, the radius of the circle inscribed in the
polygon.

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