SOLUTION: Santa has just left presents at Ms. Cane’s house and is heading for Mr.John’s place. From his sleigh Santa can see Ms. Cane’s chimney at an angle of depression of 5.3º and M

Algebra.Com
Question 1203114: Santa has just left presents at Ms. Cane’s house and is heading for Mr.John’s place. From his sleigh Santa can see Ms. Cane’s chimney at an angle of depression of 5.3º and Mr. John at 10.2º. If Ms. Cane and Mr. John lives 25 kilometers apart, calculate Santa’s altitude.
Found 3 solutions by josgarithmetic, math_tutor2020, ikleyn:
Answer by josgarithmetic(39618)   (Show Source): You can put this solution on YOUR website!
We might assume that we could ignore how high is the chimneys.
Then draw the diagram described.
Two right triangles with a common corner point; left triangle with leg x, leg y, angle at the shared point 5.3 deg. right side triangle with leg 25-x, leg y, angle at the common point 10.2 degree.

The question would be asking for y.

Solve for y.


---

The algebra or arithmetic steps give ;
.
.
Answer by math_tutor2020(3817)   (Show Source): You can put this solution on YOUR website!

Diagram


PointsAnglesSegments
The goal is to calculate the value of h.

An angle of depression is where you start looking at the horizon, then you move your viewpoint downward that number of degrees until reaching the target.
This explains how angles ACD and BCE are set up.

Angle CAF is congruent to angle ACD because of the alternate interior angle theorem. AB is parallel to DE since both are horizontal.
Also, angle CBF = angle BCE for similar reasoning.

Focus on right triangle ACF
tan(angle) = opposite/adjacent
tan(angle CAF) = CF/AF
tan(5.3) = h/x
h = x*tan(5.3)
We'll use this in a substitution step later on.

Now focus on right triangle BCF
tan(angle) = opposite/adjacent
tan(angle CBF) = CF/FB
tan(10.2) = h/(25-x)
tan(10.2) = x*tan(5.3)/(25-x) ...... Substitution: replace h with x*tan(5.3)
tan(10.2)*(25-x) = x*tan(5.3)
25*tan(10.2)-x*tan(10.2) = x*tan(5.3)
25*tan(10.2) = x*tan(5.3)+x*tan(10.2)
25*tan(10.2) = x*( tan(5.3)+tan(10.2) )
x = 25*tan(10.2)/( tan(5.3)+tan(10.2) )
x = 16.4953525945108
This value is approximate.
Make sure your calculator is in degree mode.

That x value leads to
h = x*tan(5.3)
h = 16.4953525945108*tan(5.3)
h = 1.5302275941042
This value is approximate.

Santa's altitude or height is approximately 1.5302 km
Round this value however your teacher instructs.

Extra info
1.5302 km = 5020.34121 feet (approximate)
1.5302 km = 0.9508222 miles (approximate)
Answer by ikleyn(52788)   (Show Source): You can put this solution on YOUR website!
.

Similar problem solved in the lesson
   - Find the height
in this site,  Problem  1.



RELATED QUESTIONS

Good old St.Nick needs your help getting from Nathan's house to Jack's house on Christmas (answered by stanbon)
Ok...I think I might be confusing myself (lol)...so I just want to check this out with... (answered by jim_thompson5910)
Mr. Anders and Ms. Rich each drove home from a business meeting. Mr. Anders traveled east (answered by mananth)
If Santa's sleigh is flying at an altitude of 1200 ft and begins to descend at a rate of... (answered by macston)
Mr. Santa Maria is 5 years older than his wife. 5 years ago his wife was 4/3 her age.... (answered by stanbon)
Stephen has a bowl of M&Ms, which he is eating at a constant speed. After eating for 3... (answered by josgarithmetic)
Ms. A owns a house worth $10000. She sells it to Mr. B at 10% profit. Mr. B sells the... (answered by Theo)
Macys has hired four hundred store Santa's is touch if each santa sees 125 children and... (answered by macston)
Note: My teacher says that the distance between Santa Fe and Topeka is not a factor in... (answered by Stitch)