Now find out distaste between them. Uruguay to key

**west**Florida is 4394.1 miles. Uruguay to Australia...2 Answers · Science & Mathematics · 09/03/2013

... = the angle between the line between the two airports and the direction of point C = 45° Let c = the distance between the airports and the side...

1 Answers · Science & Mathematics · 22/12/2012

52 mi/hr..use the pythagoras thm to get sqrt(48^2+20^2)

1 Answers · Science & Mathematics · 14/10/2009

Answer: 70 mi/hr work: take the derivative of the Pythagorean theorem in terms of time, since this scenario forms a right triangle: x² + y² = h² 2x(dx/dt) + 2y(dy/dt) = 2h(dh/dt) they gave us the rates at which x and y change. if we let dx/dt...

1 Answers · Science & Mathematics · 22/04/2012

distance z between them at time t from zero hour z = √((24t)² + (18t)²) = 30t dz/dt = 30 mph <------ ps: ---- dz/dt doesn't change with time in this q

2 Answers · Science & Mathematics · 17/12/2013

Since they are traveling at a right angle to each other, this is just a problem of solving the pythagorean theorem for the value C for a right triangle: A^2 + B^2 = C^2, where A & B are the distances traveled by the...

4 Answers · Science & Mathematics · 18/10/2010

not doing your homework I will help you a bit You may remember the Pythagorean theorem . a² + b² = c² a = 48 mi, b = 20 mi, c = the distance ( after one hour )

1 Answers · Science & Mathematics · 17/04/2012

..., Draw a triangle label the harbor

**point**A, the**point**directly**west point**B ant the**point**where the ship is poin C. Now we have a...3 Answers · Science & Mathematics · 03/03/2011

Treat the distance part as a Pythagorean theorem problem. 7 miles and 3 miles make up the legs of the "triangle." Thus the hypotenuse (or the length of the direct path) is: sqrt(7^2 + 3^2) = sqrt(49 + 9) = sqrt(58) = 7.62 miles You now have the...

3 Answers · Science & Mathematics · 02/06/2009

C.185 m. All the other questions are not logical.

2 Answers · Science & Mathematics · 02/11/2013