Question

Using definite integrals, find the area of the triangle formed by the given (x, y) coordinates....

Using definite integrals, find the area of the triangle formed by the given (x, y) coordinates. Do the problem by hand. Give your final answer rounded to three decimals using your calculator. (0,0) , (2, 5) , (4, 1)

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Evaluate the following integrals: a.) Find the area enclosed by y = (ln(x))/ (x^2) and y...
Evaluate the following integrals: a.) Find the area enclosed by y = (ln(x))/ (x^2) and y = (ln(x))^2/x2 ; b.) Find the volume of the solid formed by revolving the region under y = e^ 3x for 0 ≤ x ≤ 3 about the y -axis.
Use the definite integral to find the area between the​ x-axis and​ f(x) over the indicated...
Use the definite integral to find the area between the​ x-axis and​ f(x) over the indicated interval. Check first to see if the graph crosses the​ x-axis in the given interval.x f(x) = 3ex -2;[-3, 4] The area between the x-axis and f(x) is ____ (Do not round until the final answer. Then round to three decimal places as needed. It's telling me that 149.645 is wrong?
Use the triple integrals and spherical coordinates to find the volume of the solid that is...
Use the triple integrals and spherical coordinates to find the volume of the solid that is bounded by the graphs of the given equations. x^2+y^2=4, y=x, y=sqrt(3)x, z=0, in first octant.
USING ITERATED INTEGRALS, find the area bounded by the circle x^2 + y^2 = 25, a.)...
USING ITERATED INTEGRALS, find the area bounded by the circle x^2 + y^2 = 25, a.) the x-axis and the parabola x^2 − 2x = y b.) y-axis and the parabola y = 6x − x^2 b.) (first quadrant area) the y-axis and the parabola x^2 − 2x = y
Use surface integrals to find the area of the part of the surface given z =...
Use surface integrals to find the area of the part of the surface given z = x2 + y that lies above the triangle with verticies (0, 0), (1, 0), and (1, 2).
Instructions: Approximate the following definite integrals using the indicated Riemann sums. 1. Z 9 1 x...
Instructions: Approximate the following definite integrals using the indicated Riemann sums. 1. Z 9 1 x 1 + x dx using a left-hand Riemann sum L4 with n = 4 subintervals. 2. Z 3 0 x 2 dx using a midpont Riemann sum M3 using n = 3 subintervals. 3. Z 3 1 f(x) dx using a right-hand Riemann Sum R4, with n = 4 subintervals
Give a formula for the area element in the plane in rectangular coordinates x and y....
Give a formula for the area element in the plane in rectangular coordinates x and y. (Answer: dx dy, or more properly |dx ∧ dy|; either is acceptable, as are dy dx and |dy ∧ dx|.) Give a formula for the area element in the plane in polar coordinates r and θ. Give a formula for the volume element in space in rectangular coordinates x, y, and z. (Answer: dx dy dz, or more properly |dx ∧ dy ∧ dz|;...
For the given parametrized curve C, find the area above the x-y plane that is under...
For the given parametrized curve C, find the area above the x-y plane that is under C (using line integrals) C: r(t) = <3 cost, 3 sint, 2t> for 0 ≤ t ≤ 2π
Find the volume of the solid using triple integrals. The solid region Q cut from the...
Find the volume of the solid using triple integrals. The solid region Q cut from the sphere x^2+y^2+z^2=4 by the cylinder r=2sinϑ. Find and sketch the solid and the region of integration R. Setup the triple integral in Cartesian coordinates. Setup the triple integral in Spherical coordinates. Setup the triple integral in Cylindrical coordinates. Evaluate the iterated integral
Given any Cartesian coordinates, (x,y), there are polar coordinates (?,?)(r,θ) with −?2<?≤?2.−π2<θ≤π2. Find polar coordinates with...
Given any Cartesian coordinates, (x,y), there are polar coordinates (?,?)(r,θ) with −?2<?≤?2.−π2<θ≤π2. Find polar coordinates with −?2<?≤?2−π2<θ≤π2 for the following Cartesian coordinates: (a) If (?,?)=(18,−10)(x,y)=(18,−10) then (?,?)=((r,θ)=(  ,  )), (b) If (?,?)=(7,8)(x,y)=(7,8) then (?,?)=((r,θ)=(  ,  )), (c) If (?,?)=(−10,6)(x,y)=(−10,6) then (?,?)=((r,θ)=(  ,  )), (d) If (?,?)=(17,3)(x,y)=(17,3) then (?,?)=((r,θ)=(  ,  )), (e) If (?,?)=(−7,−5)(x,y)=(−7,−5) then (?,?)=((r,θ)=(  ,  )), (f) If (?,?)=(0,−1)(x,y)=(0,−1) then (?,?)=((r,θ)=( ,))