Given:
x = a tan(theta)
y = b sec(theta)
We know that:
sec(theta) = 1 / cos(theta)
tan(theta) = sin(theta) / cos(theta)
Substituting the values of sec(theta) and tan(theta), we get:
x = a (sin(theta) / cos(theta))
y = b (1 / cos(theta))
Dividing both sides of the second equation by cos(theta), we get:
y / cos(theta) = b
Substituting y / cos(theta) in the first equation, we get:
x = a (sin(theta) / (y / b))
Cross-multiplying, we get:
x = (a * b * sin(theta)) / y
Therefore, the relationship between x and y can be expressed as:
x = (a * b * sin(theta)) / y
This equation shows that x is directly proportional to the product of a and b, and inversely proportional to y. It also involves the sine of the angle theta.
Note: The variables a and b represent constant values, while theta is the variable angle.
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