Math

QuestionAn athlete releases a shot modeled by f(x)=0.04x2+2.1x+5.2f(x)=-0.04 x^{2}+2.1 x+5.2. Find the maximum height and distance from release.

Studdy Solution

STEP 1

Assumptions1. The path of the shot is modeled by the function f(x)=0.04x+.1x+5.f(x)=-0.04 x^{}+.1 x+5., where xx is the shot's horizontal distance from its point of release and f(x)f(x) is the height of the shot. . We are looking for the maximum height of the shot and the distance from the point of release at which this occurs.

STEP 2

The given function f(x)=0.04x2+2.1x+5.2f(x)=-0.04 x^{2}+2.1 x+5.2 is a quadratic function of the form f(x)=ax2+bx+cf(x)=ax^2+bx+c, where a<0a<0. The maximum value of this function occurs at the vertex of the parabola, which is given by the formula x=b2ax=-\frac{b}{2a}.

STEP 3

To find the xx-coordinate of the vertex, we plug in the coefficients aa and bb from the given function into the formula.
x=b2a=2.12(0.04)x=-\frac{b}{2a}=-\frac{2.1}{2(-0.04)}

STEP 4

Calculate the xx-coordinate of the vertex.
x=2.12(0.04)=26.25x=-\frac{2.1}{2(-0.04)}=26.25

STEP 5

The xx-coordinate of the vertex is the distance from the point of release at which the maximum height occurs. So, the maximum height occurs26.25 feet from the point of release.

STEP 6

To find the maximum height of the shot, we plug in the xx-coordinate of the vertex into the given function.
f(x)=0.04x2+2.1x+5.2f(x)=-0.04 x^{2}+2.1 x+5.2f(26.25)=0.04(26.25)2+2.1(26.25)+5.2f(26.25)=-0.04 (26.25)^{2}+2.1 (26.25)+5.2

STEP 7

Calculate the maximum height of the shot.
f(26.25)=0.04(26.25)2+2.1(26.25)+5.2=35.4375f(26.25)=-0.04 (26.25)^{2}+2.1 (26.25)+5.2=35.4375The maximum height of the shot is35.4375 feet, which occurs26.25 feet from the point of release.

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