Can I find the angle?

Look at the diagram I know $$\theta$$, $$D$$ and ratio of $$\frac{a}{b}$$ (say $$k$$). I am trying to find out $$\alpha$$. Is this possible? I couldn't crack it. (I only know the ratio of $$a$$ to $$b$$, and I don't know $$c$$ as well)

UPDATE I think I have found a solution. Look at this. x=tan($$\theta$$)*h

cos($$\alpha$$)=(2D-x)/a

cos($$\alpha$$)=2D/(a+b)

ratio of these two => (a+b)/a=2D/(2D-x)

We know a/b and D. We can find x. Since we know $$\theta$$, we can find $$\alpha$$.

I am starting a bounty for somebody who can prove this solution wrong. If it is correct, it is mine to keep.

Update2

Ok.. My bad.. I am overall decent guy but fall on my face on this one.

• Would you be happy with a solution involving $c$? I think there is no solution not involving $c$. Aug 25 '11 at 7:17
• C is not known..The solution must be without c. Aug 25 '11 at 7:18
• Your alleged solution is unclear to me. Could you write out in equations what you sketched in words at the end? Especially the part "Since we know $\theta$, we can find $\alpha$". None of the equations you've written contains only $\alpha$ and no other unknowns. Note that the two new parameters $x$ and $h$ you introduced are left invariant by the procedure I described in my answer, so they can't determine $\alpha$, since the procedure changes $\alpha$. Aug 30 '11 at 12:01
• Frank: there probably is some (perhaps a real-world?) motivation behind this question and the other one you asked. It is unfortunate that you received a negative answer twice. I suggest that you ask a question describing the actual problem, maybe somebody can help you then and that would be much more satisfactory for everyone involved. Just my two cents.
– t.b.
Aug 30 '11 at 12:58
• @theo you are right, there is a real world application. I will tell you guys when we ship. Aug 31 '11 at 0:26

Imagine changing $\alpha$ a bit. Now compensate for the change in $a/b$ by moving the top vertex up or down a bit. Now compensate for the change in $D$ by changing $c$ a bit. Now all you've changed is $\alpha$ and $c$, so you can't find $\alpha$ without $c$.

[Edit:]

Perhaps an easier way to see that there can't be a solution is to imagine the line consisting of $a$ and $b$ as a rod that always moves along such that it passes through the corner on the left and the intersection of the vertical line labeled by $h$ with the second oblique line (the one at angle $\theta$). Then if you move the second oblique line and the bottom line upwards together (thus reducing $c$), all that changes is $\alpha$, $a$, $b$ and $c$, whereas $D$, $h$, $x$, $\theta$ and $a/b$ stay the same.

• Changing $c$ will change $\alpha$ again, so this doesn't prove anything Aug 30 '11 at 12:23
• @Hannesh: Perhaps that wasn't sufficiently clear. I meant changing $c$ by simply moving the bottom line up without changing any of the lines further up. I'll include my other explanation from the comments in the answer; perhaps that's more intuitive. Aug 30 '11 at 12:30
• I will award the bounty to you Joriki as soon as I can.. thanks very much for your support Aug 31 '11 at 7:55
• Deleted my comment as I noticed that Jiri had brought up the exact same point in his figure. Sep 4 '11 at 15:57

I have copied your image below and added some constructions to help find $\tan(\alpha)$. Note that there are three similar right triangles, each with an angle of $\theta$. They are similar because they are right triangles and share the opposite (also called vertical) angles near the right arrow under $c\tan(\theta)$.

We can compute the length of the hypotenuse of the right triangle with the dashed, red side and angle of $\theta$ to be $D+c\tan(\theta)$, then compute the dashed, red side to be $D\cos(\theta)+c\sin(\theta)$. From there, it is pretty easy to compute $a$, $a+b$, and then take their ratio. Solving, we get $$\tan(\alpha)=\cot(\theta)-\frac{a/b+1}{a/b}\frac{\cot(\theta)+c/D}{2}$$ This requires only that we know $a/b$, $c/D$, and $\cot(\theta)$, but $\tan(\alpha)$ is definitely dependent on $c/D$.

You can compute $x$ and $h$. (BTW, your second equation should be $\cos(\alpha) = (D+x)/a$.). Even then, you cannot determine $\alpha$. You just got the point $S$. According to the Intercept theorem all the red lines in the figure passing through $S$ have the same ratio $k = a/b$ but they have different angles $\alpha$ to the horizontal line.

EDIT. I am adding the explicit formulae for $x$ and $h$. We have $$(1) \;\;\; \cos(\alpha) = (D+x) / a$$ $$(2) \;\;\; \cos(\alpha) = 2D / (a+b)$$

From (1) and (2) we get

$$x = D (k-1) / (k+1)$$

Further, we obtain $h$ as $$h = x / tan(\theta)$$

Now, the above geometric argument is applied. In addition, we see that $\alpha$ cannot be obtained from the equations (1) and (2) without knowing either $a$ or $a+b$.

• I am having a hard time scrolling back and forth, but this looks like a different diagram than the one above. Aug 30 '11 at 15:57
• @Greg: I had some problems with the upload of the figure. Should be OK now. Aug 30 '11 at 16:11