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The base of a triangle is 10 cm greater than the height. The area is 28 cm squared. What is the base and height?
Area of a triangle = 1/2 x (base) x (height) In this situation, the base [b] = height [h] + 10 And the Area = 28 So the 28 = 1/2 x (h + 10) x h The base is 14 cm and the height is 4 cm
What is the area of a triangle with a base of 4 units and a height of 14 units?
area of a triangle = (base x height)/2 = (4 units x 14 units)/2 =28 square units
What is the area if The perimeter of a square is 28 feet?
All sides of a square are the same so if the perimeter = 28 feet then one side = 7 feetArea of a square = base x height 7 x 7 49 square feet
A conical tent of 56m base diameter requires 3080sqm curved surfacefind it's height?
Well, isn't that just a happy little math problem we have here! To find the height of the conical tent, we first need to calculate the slant height using the curved surface area formula: π * base diameter * slant height = curved surface area. So, in this case, the slant height would be 3080 / (π * 56) = approximately 17.5m. Then, we can use the Pythagorean theorem to find the height by considering the radius, slant height, and height as a right triangle. Happy calculating!
What is the area of a 28 cm circle using pi?
The area of a circle with a diameter of 28 cm is pi*(d/2)2= 615.8 cm2 The area of a circle with a diameter of 28 cm is pi*(d/2)2= 615.8 cm2 The area of a circle with a diameter of 28 cm is pi*(d/2)2= 615.8 cm2 The area of a circle with a diameter of 28 cm is pi*(d/2)2= 615.8 cm2
What is the base of a rectangle with height of 4 and area of 28?
7. Since the area of a rectangle is base x height, the base must be the area (28) divided by the height (4). 28/4 = 7
If the base of an isosceles triangle is 22 and the height is 28 how do you figure out the area?
area of a triangle is half the base times the height .5*22*28=308
The base of a triangle is 10 cm greater than the height. The area is 28 cm squared. What is the base and height?
Area of a triangle = 1/2 x (base) x (height) In this situation, the base [b] = height [h] + 10 And the Area = 28 So the 28 = 1/2 x (h + 10) x h The base is 14 cm and the height is 4 cm
What is the height of a triangle that has a base of 8in and an area of 28in squared?
Area = 0.5*base*height 28 = 0.5*8*height So height = 7 inches.
What is the height of a triangle that has a base of 8 in and an area of 28 in2?
7 in
The base of a triangle is 8 cm. the triangle has a area of 28cm2 the height of the triangle is cm?
Area of Triangle = 1/2 base x height 28 = 4 x height height = 7 cms
What is the area of a triangle with a base of 4 units and a height of 14 units?
area of a triangle = (base x height)/2 = (4 units x 14 units)/2 =28 square units
What is the base area of a box with the height of 13 in length 8 in and width 3.5 in?
The height is irrelevant to the area of the base, which is (8 inches)(3.5 inches) or 28 square inches.
The base of a triangle is 8cm the triangle has an area of 28cm squared What is the height of the triangle?
Area of a triangle = 1/2 * base * heightWe have,Area = 28 cm squared, base = 8cmthen,28 = 1/2 * 8 * h28 = 4*hh = 7cm
The base of a triangle is equal to 4 what is the height of the triangle if the area is 28?
If the base of a triangle is b and the height of the triangle is h, the area of the triangle is given by the formula: area = 0.5 x b x h.As such, in your case we have 28 = 0.5 x 4 x h, which means that h = 14.
What is the height of the triangular prism below if the volume equals 1638 cubic millimeters 65 mm 63 mm 26 mm 28 mm?
To find the height of the triangular prism, we need to use the formula for the volume of a prism: ( V = \text{Base Area} \times \text{Height} ). First, we determine the area of the triangular base using the formula for the area of a triangle: ( \text{Area} = \frac{1}{2} \times \text{base} \times \text{height} ). Given the dimensions, the base area can be calculated, and then rearranging the volume formula allows us to solve for the height of the prism, ultimately yielding a height of approximately 28 mm.
Find the volume of a solid?
a base of a right solid whose height is 6 centementers shown. Find the volume. area is 28 cm and the height is 7cm
