Gambarsaengx

The maximum area of the rectangle is given by \{S_{\max }} = a\sqrt 2 \cdot b\sqrt 2 = 2ab\ It is interesting to note the special case where the ellipse has equal major and minor axes, that is it is a circle \a = b = R\ In this case, the rectangle with the largest area isShaded region be required region So, from above diagram Consider equations from the given inequalities, y 2 = 2x and x – y = 4 Question 6 Find the area bounded by the parabola y = x 2 – 1, the tangent at the point (2, 3) to it and the yaxis Solution Equation of parabola y = x 2 – 1Calculating the area of D is equivalent to computing double integral ∬DdA To calculate this integral without Green's theorem, we would need to divide D into two regions the region above the x axis and the region below The area of the ellipse is ∫a −a∫√b2 − ( 19 Consider The Parabola Y X2 1 1 The Shaded Area Is Consider the parabola y=x^2 the shaded area is