A crocodile is stalking prey located 20 metres further upstream on the opposite bank of a river - Scottish Highers Maths - Question 8 - 2015

To minimize the time taken, we need to differentiate T(x) with respect to x:

$T(x) = 5 ext{√}(36 - x^2) + 4(20 - x)$

We start by differentiating:

1. Differentiate the first term: rac{d}{dx} ext{√}(36 - x^2) = -rac{x}{ ext{√}(36 - x^2)}
2. Differentiate the second term: rac{d}{dx}[4(20 - x)] = -4

Setting the derivative equal to zero: rac{5rac{-x}{ ext{√}(36 - x^2)}}{2} - 4 = 0

Solving this gives:

1. Cross multiply: $5(-x) = 4 ext{√}(36 - x^2)$
2. Square both sides and simplify: $25x^2 = 16(36 - x^2)$ $25x^2 + 16x^2 = 576$ $41x^2 = 576$ x^2 = rac{576}{41} x = ext{√}rac{576}{41}

Calculating this gives an approximately minimized x which helps calculate T(x). Therefore, calculating for minimum time gives:

After substituting the value of x back into T(x) provides the minimum possible time.

From earlier calculations, we determined that: x = ext{√}rac{576}{41}

Utilizing this, we substitute back into the original time equation T(x):

By plugging the appropriate values into T, we find:

the minimum possible time is approximately ( 9.8 ) tenths of seconds.