Surface area of a Pyramid 9 centimeters by 46 foot by 3 inches Calculator

The surface area of a pyramid is equal to the sum of the areas of each side of the pyramid. The base of the pyramid has area l x w , and sl and sw represent the slant height on the length and slant height on the width. If the Pyramid has a length 9 centimeters by width 46 foot by height 3 inches is 29817.3349268 centimeters² or 4857.1236815 inches² or 33.7300262 foot²

Steps:

The Surface area of Pyramid A = $lw+l$$\sqrt{(\frac{w}{2})^2+(h)^2}$$+w$$\sqrt{(\frac{l}{2})^2+(h)^2}$

Substitute the values of the length l = 9 cm, the width w = 46 ft and the height h = 3 in into the formula for surface area of a pyramid

A=($9 \cdot1402.08+9$$\sqrt{(\frac{1402.08}{2})^2+(7.62)^2}$$+1402.08$$\sqrt{(\frac{9}{2})^2+(7.62)^2}$) cm

Simplify each term.

Multiply 9 cm by 1402.08 cm

A = $12618.72+9$$\sqrt{(\frac{1402.08}{2})^2+(7.62)^2}$$+1402.08$$\sqrt{(\frac{9}{2})^2+(7.62)^2}$

Square root of $\sqrt{(\frac{1402.08}{2})^2+(7.62)^2}$ is 701.0814118

Put The values in Area Formula:

A= $12618.72+ 9 \cdot 701.0814118+1402.08$$\sqrt{(\frac{9}{2})^2+(7.62)^2}$

Square Root of $\sqrt{(\frac{9}{2})^2+(7.62)^2}$ is 7.7662346

Put The values in Area Formula:

A= 12618.72 + (9 x 701.0814118) + (1402.08 x 7.7662346)

Multiply 9 and 701.0814118

A= 12618.72 + 6309.7327064 + (1402.08 x 7.7662346)

Multiply 1402.08 and 7.7662346

A= 12618.72 + 6309.7327064 + 10888.8822204

Add 12618.72 and 6309.7327064

A= 18928.4527064 + 10888.8822204

A= 29817.3349268 cm²

∴ The Surface Area of Pyramid length 9 cm , width 46 ft and height 3 in is 29817.3349268 cm²

or

A=($3.5433071 \cdot552.0+3.5433071$$\sqrt{(\frac{552.0}{2})^2+(3)^2}$$+552.0$$\sqrt{(\frac{3.5433071}{2})^2+(3)^2}$) in

Simplify each term.

Multiply 3.5433071 in by 552.0 in

A = $1955.9055192+3.5433071$$\sqrt{(\frac{552.0}{2})^2+(3)^2}$$+552.0$$\sqrt{(\frac{3.5433071}{2})^2+(3)^2}$

Square root of $\sqrt{(\frac{552.0}{2})^2+(3)^2}$ is 276.0163039

Put The values in Area Formula:

A= $1955.9055192+ 3.5433071 \cdot 276.0163039+552.0$$\sqrt{(\frac{3.5433071}{2})^2+(3)^2}$

Square Root of $\sqrt{(\frac{3.5433071}{2})^2+(3)^2}$ is 3.4840718

Put The values in Area Formula:

A= 1955.9055192 + (3.5433071 x 276.0163039) + (552.0 x 3.4840718)

Multiply 3.5433071 and 276.0163039

A= 1955.9055192 + 978.0105292 + (552.0 x 3.4840718)

Multiply 552.0 and 3.4840718

A= 1955.9055192 + 978.0105292 + 1923.2076331

Add 1955.9055192 and 978.0105292

A= 2933.9160484 + 1923.2076331

A=$4857.1236815$ in²

∴ The Surface Area of Pyramid length 9 cm , width 46 ft and height 3 in is 4857.1236815 in²

or

A=($0.2952756 \cdot46+0.2952756$$\sqrt{(\frac{46}{2})^2+(0.25)^2}$$+46$$\sqrt{(\frac{0.2952756}{2})^2+(0.25)^2}$) ft

Simplify each term.

Multiply 0.2952756 ft by 46 ft

A = $13.5826776+0.2952756$$\sqrt{(\frac{46}{2})^2+(0.25)^2}$$+46$$\sqrt{(\frac{0.2952756}{2})^2+(0.25)^2}$

Square root of $\sqrt{(\frac{46}{2})^2+(3)^2}$ is 23.0013587

Put The values in Area Formula:

A= $13.5826776+ 0.2952756 \cdot 23.0013587+46$$\sqrt{(\frac{0.2952756}{2})^2+(0.25)^2}$

Square Root of $\sqrt{(\frac{0.2952756}{2})^2+(0.25)^2}$ is 0.2903393

Put The values in Area Formula:

A = 13.5826776 + (0.2952756 x 23.0013587) + (46 x 0.2903393)

Multiply 0.2952756 and 23.0013587

A = 13.5826776 + 6.79174 +(46 x 0.2903393)

Multiply 46 and 0.2903393

A= 13.5826776 + 6.79174 + 13.3556087

Add 13.5826776 and 6.79174

A = 20.3744176 + 13.3556087

A= 33.7300262 ft²

∴ The Surface Area of Pyramid length 9 cm , width 46 ft and height 3 in is 33.7300262 ft²