HELP PLEASE!! As John walks 16 ft towards a chimney, the angle of elevation from his eye to the top of the chimney changes from 30° to 45°. Identify the height of the chimney from John's eye level to the top of the chimney rounded to the nearest foot.

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05-04-2019
Mathematics

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HELP PLEASE!! As John walks 16 ft towards a chimney, the angle of elevation from his eye to the top of the chimney changes from 30° to 45°. Identify the height of the chimney from John's eye level to the top of the chimney rounded to the nearest foot.

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luisejr77 luisejr77 · Answer 1 · 2019-04-14T03:28:28+02:00

Answer: 22 feet.

Step-by-step explanation:

Note that there are two right triangles in the figure attached: ACD and BCD. Where "h" is the height of the chimeney from John's eye level to the top of the chimney.

You need to use the trigonometric identity [tex]tan\alpha=\frac{opposite}{adjacent}[/tex] for this exercise.

For the triangle BCD:

[tex]tan(45\°)=\frac{h}{x}[/tex]

Solve for h:

[tex]h=xtan(45\°)\\h=x[/tex]

For the triangle ACD:

[tex]tan(30\°)=\frac{h}{x+16}[/tex]

Substitute [tex]h=x[/tex] and solve for h:

[tex]tan(30\°)=\frac{h}{h+16}\\\\(h+16)(tan(30\°))=h\\\\0.577h+9.237=h\\\\9.237=h-0.577h\\\\9.237=0.423h\\\\h=\frac{9.237}{0.423}\\\\h=21.836ft[/tex]

Rounded to the nearest foot:

[tex]h=22ft[/tex]