A = 0,5 * (a + b ) * h
126 = (16 + b ) * 9
126 / 9 = b + 16
b = (126 / 9 ) - 16
= 14 - 16
= -2
This might sound stupid but it's the correct answer.
Volume = (length x width) x (height) = (base area) x (height) = (56 x 6) = 336 cubic inches
Height of trapezoid = 2*area/sum of parallel sides
False because the area of a trapezoid is: 0.5*(sum of its parallel sides)*height
ok
If the base length b and the top length a remain the same, then the area will double if the height his doubled.Area = ((a+b) x h ) / 2Please note that a trapezoid has the top a and base b parallel.
The area of any trapezoid is 1/2 times (length of one base plus length of the other base) times (height). You ought to be able to handle it from there.
in simple math terms it is the length times height of a 2 dimension object the units are squared so if the length is five in and the height is 4 inches then the area would be 20 inches^2(squared)
in simple math terms it is the length times height of a 2 dimension object the units are squared so if the length is five in and the height is 4 inches then the area would be 20 inches^2(squared)
1332 inches squared
No THIS IS SQUARED - 22 THIS IS CUBED- 23 Squared means length times width, or X2. Cubed means length times width times height, or X3.
No! Length squared will be the length times the length again. Length times height is going to find the area so it will not be the same.
Area of a trapezoid = 0.5*(sum of parallel sides)*height
Length times width
Volume = (length x width) x (height) = (base area) x (height) = (56 x 6) = 336 cubic inches
Area of a trapezoid = 0.5*( sum of parallel sides)*height
Height of trapezoid = 2*area/sum of parallel sides
If you draw another altitude parallel to the height (the side which is perpendicular to the bases) of the trapezoid, you can see that a right triangle is formed.In this triangle the hypotenuse length is 17 in, and the base length equals to 28 - 16 = 12 in. From the Pythagorean theorem, height length = √(17 - 12) ≈ 12 in.Or find the measure of the angle (call it A) opposite to the height such as:cos A = 12/17A = cos-1 (12/17) ≈ 45⁰, which tells us that this right triangle is an isosceles triangle.Therefore, the height is (congruent with base) 12 inches long