#2. An isosceles triangle has a base of 6 units, and an area of 36 square...

An isosceles triangle has a base of 6 units and an area of ​​36 square units....

An isosceles triangle has a base of 6 units and an area of ​​36 square units. Find the dimensions of the rectangle with the largest area that can be placed inside the triangle, with one of the sides at the base of the triangle.

An isosceles triangle has a base of 6 units, and an area of 36 units squared....

An isosceles triangle has a base of 6 units, and an area of 36 units squared. Find the dimensions of the rectangle with the maximum area that can be put into the triangle, with one of its sides in or at the base of the triangle mentioned. (Optimization problem) Help! thank you.

Isosceles triangle base length is 15 inches, it also has 2 congruent sides with 15 inches...

Isosceles triangle base length is 15 inches, it also has 2 congruent sides with 15 inches each. Find the height of the triangle.

( PARTA) Find the dimensions (both base and height ) of the rectangle of largest area...

( PARTA) Find the dimensions (both base and height ) of the rectangle of largest area that has its base on the x-axis and its other two vertices above the x-axis and lying on the parabola below. y = 8 − x (PARTB) A box with a square base and open top must have a volume of 62,500 cm3. Find the dimensions( sides of base and the height) of the box that minimize the amount of material used.

Suppose that a right triangle has legs of lengths 3 cm and 2 cm. (Note that...

Suppose that a right triangle has legs of lengths 3 cm and 2 cm. (Note that the legs of a right triangle are the two sides that are not the hypotenuse.) A rectangle is inscribed in this right triangle so that two sides of the rectangle lie along the legs. Find the largest possible area of such a rectangle.

The irregular hexagon below is composed of a square and a triangle. The length of the...

The irregular hexagon below is composed of a square and a triangle. The length of the base of the triangle is twice that of a side of the square; its height is equal to the length of a side of the square. Assume that the hexagon also has an area of 32 square units. What are the measures of the sides of the square and the base and height of the triangle? What are the areas of the square and...

Draw a diagram and solve: What is the exact area of the biggest isosceles triangle you...

Draw a diagram and solve: What is the exact area of the biggest isosceles triangle you can inscribe above the x-axis and under the parabola y=4−x2? Hint: the vertex of the triangle is at the origin and the base of the triangle is parallel to the X- Axis

1- An open box with a square base is to have a volume of 10 ft3....

1- An open box with a square base is to have a volume of 10 ft3. (a) Find a function that models the surface area A of the box in terms of the length of one side of the base x. (b) Find the box dimensions that minimize the amount of material used. (Round your answers to two decimal places.) 2- Find the dimensions that give the largest area for the rectangle. Its base is on the x-axis and its...

Solve the composite shape for total surface area to determine the amount of aluminum required for...

Solve the composite shape for total surface area to determine the amount of aluminum required for the construction of all the components. Isosceles Trapezoid Dimensions: Upper base b1 = 2 cm Lower base B2 = 4 cm Height of trapezoid = __cm Area of trapezoid = __cm^2 Triangle at Top of Isosceles Trapezoid: Sides = 2 cm, 2.25 cm, 1.87 cm Area:___cm^2 Triangle at Bottom of Isosceles Trapezoid: Sides: 4 cm, 4.5 cm, 3.75 cm Area = ___cm^2 Heron's Formula...

1. Consider the equation below. (If an answer does not exist, enter DNE.) f(x) = e2x...

1. Consider the equation below. (If an answer does not exist, enter DNE.) f(x) = e2x + e−x (b) Find the local minimum and maximum values of f. local minimum value 2. A particle is moving with the given data. Find the position of the particle. a(t) = 13 sin(t) + 6 cos(t),    s(0) = 0,    s(2π) = 10 3. Find the area of the largest rectangle that can be inscribed in the ellipse x2 a2 + y2 b2 = 1. 4....