Pre-Calculus Problems: Conic Sections, Trigonometric Identities, and Function Operations
Published on September 1, 2024
Question
Answer
Let’s solve these pre-calculus problems step by step.
- Determine the type of conic section represented by the equation:
a.
To determine the type of conic section, we need to look at the coefficients of
and
.
- Coefficient of
is 1 - Coefficient of
is -1
Since these coefficients have opposite signs and equal absolute values, this equation represents a hyperbola.
b.
In this equation:
- There’s no
term - Coefficient of
is positive (10)
This equation represents a parabola.
c.
Here:
- Coefficient of
is 2 - Coefficient of
is 2
Since these coefficients are equal and positive, this equation represents a circle.
- Prove the identity:
a.
This is a fundamental trigonometric identity. It states that sine is an odd function, which means it changes sign when the angle is negated.
b.
To prove this:
- Recall the Pythagorean identity:
- Divide both sides by
:
- Simplify:
- Subtract
from both sides:
Thus, the identity is proved.
- If
and , solve the following:
a.
b.
c.
These are the solutions to the given pre-calculus problems.