More Applications of Derivatives 193the path. The acceleration vector is
〈
d^2 x
dt^2,
d^2 y
dt^2〉
and the magnitude of acceleration is|a|=
√(
d^2 x
dt^2) 2
+(
d^2 y
dt^2) 2. The vectorTtangent to the path attisT(t)=
∥r′(t)
∥r′(t)∥∥and
the normal vector attisN(t)=
∥T′(t)
∥T′(t)∥∥.
Example 1
The position functionr=
〈
t^3 ,t^2〉
=t^3 i+t^2 jdescribes the path of an object moving in the
plane. Find the velocity and acceleration of the object at the point (8, 4).
Step 1: The velocityv=
〈
dx
dt,
dy
dt〉
=〈
3 t^2 ,2t〉. At the point (8, 4),t=2. Evaluated at
t=2, the velocityv=
〈
12, 4〉. The speed|v|=
√
144 + 16 ≈ 12 .649.Step 2: The acceleration vector
〈
d^2 x
dt^2,
d^2 y
dt^2〉
=〈
6 t,2〉. Evaluated att=2, the acceleration
is
〈
12, 2〉. The magnitude of the acceleration is|a|=
√
144 + 4 ≈ 12 .166.Example 2
The left field fence in Boston’s Fenway Park, nicknamed the Green Monster, is 37 feet high
and 310 feet from home plate. If a ball is hit 3 feet above the ground and leaves the bat at
an angle of
π
4
, write a vector-valued function for the path of the ball and use the function
to determine the minimum speed at which the ball must leave the bat to be a home run. At
that speed, what is the maximum height the ball attains?
Step 1: The horizontal component of the ball’s motion, the motion in the “x” direc-
tion, isx=s·cos
π
4
·t=s√
2
2
t. The vertical component follows the parabolicmotion model y = 3 +s ·sin
π
4
t −1
2
gt^2 , whereg is the acceleration due to
gravity. The path of the ball can be represented by the vector-valued functionr=〈
s·√
2
2
t,3+s·√
2
2
t− 16 t^2〉
.Step 2: In order for the ball to clear the fence, its height must be greater than 37 feet when
its distance from the plate is 310 feet.s·√
2
2
t=310, solved fort, givest=620
s·√
2seconds. At this time, 3+
s·√
2
2t− 16 t^2 = 3 +
s√
2
2(
620
s√
2)
− 16(
620
s√
2) 2
, andthis value must exceed 37 feet. Setting 3+s·√
2
2(
620
s·√
2)
− 16(
620
s·√
2) 2
= 37and solving givess ≈ 105 .556. The ball must leave the bat at 105.556 feet per
second in order to clear the wall.