Surface area of a Pyramid 10 centimeters by 46 foot by 2 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 10 centimeters by width 46 foot by height 2 inches is 28490.9767347 centimeters² or 4808.9179953 inches² or 33.3952657 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 = 10 cm, the width w = 46 ft and the height h = 2 in into the formula for surface area of a pyramid

A=($10 \cdot1402.08+10$$\sqrt{(\frac{1402.08}{2})^2+(5.08)^2}$$+1402.08$$\sqrt{(\frac{10}{2})^2+(5.08)^2}$) cm

Simplify each term.

Multiply 10 cm by 1402.08 cm

A = $14020.8+10$$\sqrt{(\frac{1402.08}{2})^2+(5.08)^2}$$+1402.08$$\sqrt{(\frac{10}{2})^2+(5.08)^2}$

Square root of $\sqrt{(\frac{1402.08}{2})^2+(5.08)^2}$ is 701.0584056

Put The values in Area Formula:

A= $14020.8+ 10 \cdot 701.0584056+1402.08$$\sqrt{(\frac{10}{2})^2+(5.08)^2}$

Square Root of $\sqrt{(\frac{10}{2})^2+(5.08)^2}$ is 5.3203759

Put The values in Area Formula:

A= 14020.8 + (10 x 701.0584056) + (1402.08 x 5.3203759)

Multiply 10 and 701.0584056

A= 14020.8 + 7010.5840556 + (1402.08 x 5.3203759)

Multiply 1402.08 and 5.3203759

A= 14020.8 + 7010.5840556 + 7459.5926791

Add 14020.8 and 7010.5840556

A= 21031.3840556 + 7459.5926791

A= 28490.9767347 cm²

∴ The Surface Area of Pyramid length 10 cm , width 46 ft and height 2 in is 28490.9767347 cm²

or

A=($3.9370079 \cdot552.0+3.9370079$$\sqrt{(\frac{552.0}{2})^2+(2)^2}$$+552.0$$\sqrt{(\frac{3.9370079}{2})^2+(2)^2}$) in

Simplify each term.

Multiply 3.9370079 in by 552.0 in

A = $2173.2283608+3.9370079$$\sqrt{(\frac{552.0}{2})^2+(2)^2}$$+552.0$$\sqrt{(\frac{3.9370079}{2})^2+(2)^2}$

Square root of $\sqrt{(\frac{552.0}{2})^2+(2)^2}$ is 276.0072463

Put The values in Area Formula:

A= $2173.2283608+ 3.9370079 \cdot 276.0072463+552.0$$\sqrt{(\frac{3.9370079}{2})^2+(2)^2}$

Square Root of $\sqrt{(\frac{3.9370079}{2})^2+(2)^2}$ is 2.8062444

Put The values in Area Formula:

A= 2173.2283608 + (3.9370079 x 276.0072463) + (552.0 x 2.8062444)

Multiply 3.9370079 and 276.0072463

A= 2173.2283608 + 1086.6427091 + (552.0 x 2.8062444)

Multiply 552.0 and 2.8062444

A= 2173.2283608 + 1086.6427091 + 1549.0469254

Add 2173.2283608 and 1086.6427091

A= 3259.8710699 + 1549.0469254

A=$4808.9179953$ in²

∴ The Surface Area of Pyramid length 10 cm , width 46 ft and height 2 in is 4808.9179953 in²

or

A=($0.328084 \cdot46+0.328084$$\sqrt{(\frac{46}{2})^2+(0.1666667)^2}$$+46$$\sqrt{(\frac{0.328084}{2})^2+(0.1666667)^2}$) ft

Simplify each term.

Multiply 0.328084 ft by 46 ft

A = $15.091864+0.328084$$\sqrt{(\frac{46}{2})^2+(0.1666667)^2}$$+46$$\sqrt{(\frac{0.328084}{2})^2+(0.1666667)^2}$

Square root of $\sqrt{(\frac{46}{2})^2+(2)^2}$ is 23.0006039

Put The values in Area Formula:

A= $15.091864+ 0.328084 \cdot 23.0006039+46$$\sqrt{(\frac{0.328084}{2})^2+(0.1666667)^2}$

Square Root of $\sqrt{(\frac{0.328084}{2})^2+(0.1666667)^2}$ is 0.2338537

Put The values in Area Formula:

A = 15.091864 + (0.328084 x 23.0006039) + (46 x 0.2338537)

Multiply 0.328084 and 23.0006039

A = 15.091864 + 7.5461301 +(46 x 0.2338537)

Multiply 46 and 0.2338537

A= 15.091864 + 7.5461301 + 10.7572715

Add 15.091864 and 7.5461301

A = 22.6379941 + 10.7572715

A= 33.3952657 ft²

∴ The Surface Area of Pyramid length 10 cm , width 46 ft and height 2 in is 33.3952657 ft²