The given question can be represented as a figure as shown in the attachment.
Let h be the height of the balloon above the river.
x be the distance of the balloon from the sailboat and y be the distance between the sail boat and the canoe where y=s+t (from the figure).
Given that the distance between the balloon and the canoe is 650m.
Now we know that,
sin\theta=\frac{Opposite\ side}{Hypotenuse}
So we can write,
sin29^0=\frac{h}{650}
i.e.
h=650sin29^0=650\times 0.4848=315.12\ m
Now similarly,
sin48^0=\frac{h}{x}
i.e.
x=\frac{h}{sin48^0}=\frac{315.12}{0.7431}=424.06\ m
Now we know that,
tan\theta=\frac{Opposite\ side}{Adjacent \ side}
So we can write,
tan48^0=\frac{h}{s}=\frac{315.12}{s}
i.e.
s=\frac{315.12}{tan48^0}=\frac{315.12}{1.111}= 283.64\ m
And,
tan29^0=\frac{h}{t}=\frac{315.12}{t}
i.e.
t=\frac{315.12}{tan29^0}=\frac{315.12}{0.5543}=568.50\ m
Finally,
y=s+t=283.64+568.50=852.14\ m
Hence we have the answers as:
a) Height of the balloon = h = 315.12 m
b) Distance between the balloon and the sailboat = x = 424.06 m
c) Distance between the sailboat and the canoe = y = 852.14 m
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