1 Answer

Jama · Answer 1 · 2023-05-28T01:53:20+0000

Given:

An architect has designed two tunnels.

Tunnel A is modeled by:

Tunnel B is modeled by:

Part A: write the equation of tunnel A in standard from

So, we will complete the square for the two variables x, and y as follows:

$\begin{gathered} (x^2+30x)+y^2=-56 \\ (x^2+30x+225)+y^2=-56+225 \\ (x+15)^2+y^2=169 \\ (x+15)^2+y^2=13^2 \end{gathered}$

So, the answer to part A:

The equation will be: (x+15)² + y² = 13²

The conic section is: Circle with canter (-15, 0) and radius = 13 feet

Part B: Write the equation of tunnel B in standard from

So, we will complete the square for the variable x as follows:

$\begin{gathered} (x^2-30x)=-16y+95 \\ (x^2-30x+225)=-16y+95+225 \\ (x-15)^2=-16y+320 \\ (x-15)^2=-16(y-20) \\ (x-15)^2=-4(4)(y-20) \end{gathered}$

So, the answer to part B:

The equation will be: (x-15)² = -4(4)(y-20)

The conic section is: a Parabole with the vertex at (15, 20)

Part C: Determine the maximum height of each tunnel.

Tunnel A:

So, the radius = 13, so, the diameter = 2 * 13 = 26

So, the maximum height = 13 feet

The truck has a height = of 13.5 feet

so, it will not be able to pass through the tunnel A

Tunnel B:

when y = 0, solve for x:

$\begin{gathered} (x-15)^2=-16*-20 \\ (x-15)^2=320 \\ x-15=\pm√(320) \\ x=15\pm√(320)=32.88,-2.88 \end{gathered}$

When x = 15, we will find the maximum height

$\begin{gathered} 0=-16(y-20) \\ y-20=0 \\ y=20 \end{gathered}$

So, the maximum height = 20 feet

the truck will be able to pass through the tunnel

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