Problem:
Right triangle ACD with right angle at C is constructed outwards on the hypotenuse AC of isosceles right triangle ABC with leg length 1 , as shown, so that the two triangles have equal perimeters. What is sin(2β BAD) ?
Answer Choices:
A. 31β
B. 22ββ
C. 43β
D. 97β
E. 23ββ Solution:
Firstly, note by the Pythagorean Theorem in β³ABC that AC=2β. Now, the equal perimeter condition means that BC+BA=2=CD+DA, since side AC is common to both triangles and thus can be discounted. This relationship, in combination with the Pythagorean Theorem in β³ACD, gives AC2+CD2=(2β)2+(2βDA)2=DA2. Hence 2+4β4DA+DA2=DA2, so DA=23β, and thus CD=21β.
Next, since β BAC=45β,sin(β BAC)=cos(β BAC)=2β1β. Using the lengths found above, sin(β CAD)=(23β)(21β)β=31β, and cos(β CAD)=(23β)2ββ=322ββ.
Thus, by the addition formulae for sin and cos, we have
cos(β BAD)=cos(β BAC+β CAD) =cos(β BAC)cos(β CAD)βsin(β BAC)sin(β CAD) =2β1ββ 322βββ2β1ββ 31β =32β22ββ1β
Hence, by the double angle formula for sin,sin(2β BAD)=2sin(β BAD)cos(β BAD)=182(8β1)β=(D)97ββ.
OR
We use the Pythagorean Theorem, as in Solution 1, to find AD=23β and CD=21β. Now notice that the angle between CD and the vertical (i.e. the y-axis) is 45β - to see this, drop a perpendicular from D to BA which meets BA at E, and use the fact that the angle sum of quadrilateral CBED must be 360β. Anyway, this implies that the line CD has slope 1, so since C is the point (0,1) and the length of CD is 21β,D has coordinates ββββββ0+2β(21β)β,1+2β(21β)ββ βββββ=(22β1β,1+22β1β).
Thus we have the lengths DE=1+22β1β (it is just the y-coordinate) and AE=1β22β1β. By simple trigonometry in β³DAE, we now find
