Surface area of a Pyramid 8 foot by 58 meters by 3 inches Calculator
The Surface Area of Pyramid 8 foot by width 58 meters by height 3 inches is 2556.7486358 foot2 or 438638.5640978 inches2 or 282.992622 meters2
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 8 foot by width 58 meters by height 3 inches is 2556.7486358 foot2 or 438638.5640978 inches2 or 282.992622 meters2
Surface Area of a Pyramid 8 ft by 58 m by 3 in in other units
Value | unit |
---|---|
0.779297 | km2 |
0.4842339 | mi2 |
779.2969842 | m2 |
2556.7486358 | ft2 |
30680.9836296 | in2 |
852.2495453 | yd2 |
77929.6984192 | cm2 |
779296.9841918 | mm2 |
Steps:
The Surface area of Pyramid A = $lw+l$$\sqrt{(\frac{w}{2})^2+(h)^2}$$+w$$\sqrt{(\frac{l}{2})^2+(h)^2}$
Substitute the values of the length l = 8 ft, the width w = 58 m and the height h = 3 in into the formula for surface area of a pyramid
Unit Conversion of 3 in = 0.25 ft
3 Inches is 0.25 feet
To convert Inches to Feet
we know that, 1 Inches = 0.0833333 Feet or
1 Foot = 1/12 foot
To convert Inches to Feet, divide the inche value by 12.
Result in Foot: 3 × in/12 × ft/in
Cancel The Comman factor of in
Result in Feet: $3\above 1pt12$
Divide the 3 by 12
Result in Feet: 0.25 feet
∴ 3 Inches = 0.25 feet
Unit Conversion of 58 m = 190.28872 ft
58 Meters is 190.28872 foot
To convert Meters to Foot
we know that, 1 Meter = 3.28084 Foot
To convert Meter to Foot, multiply the meter value by 3.28084.
Result in Foot: 58 m × 3.28084 × ft/m
Cancel The Comman factor of m
Result in Foot: (58 x 3.28084 ft)
Multiply 58 into 3.28084
Result in Foot: 190.28872 foot
∴ 58 Meters = 190.28872 foot
A=($8 \cdot190.28872+8$$\sqrt{(\frac{190.28872}{2})^2+(0.25)^2}$$+190.28872$$\sqrt{(\frac{8}{2})^2+(0.25)^2}$) ft
Simplify each term.
Multiply 8 ft by 190.28872 ft
A = $1522.30976+8$$\sqrt{(\frac{190.28872}{2})^2+(0.25)^2}$$+190.28872$$\sqrt{(\frac{8}{2})^2+(0.25)^2}$
Square root of $\sqrt{(\frac{190.28872}{2})^2+(0.25)^2}$ is 95.1446884
Put The values in Area Formula:
A= $1522.30976+ 8 \cdot 95.1446884+190.28872$$\sqrt{(\frac{8}{2})^2+(0.25)^2}$
Square Root of $\sqrt{(\frac{8}{2})^2+(0.25)^2}$ is 1.4361407
Put The values in Area Formula:
A= 1522.30976 + (8 x 95.1446884) + (190.28872 x 1.4361407)
Multiply 8 and 95.1446884
A= 1522.30976 + 761.1575076 + (190.28872 x 1.4361407)
Multiply 190.28872 and 1.4361407
A= 1522.30976 + 761.1575076 + 273.2813682
Add 1522.30976 and 761.1575076
A= 2283.4672676 + 273.2813682
A= 2556.7486358 ft2
∴ The Surface Area of Pyramid length 8 ft , width 58 m and height 3 in is 2556.7486358 ft2
or
Unit Conversion of 58 m = 2283.46 in
58 meter is 2283.46 inches
To convert Meters to Inches
we know that, 1 Meter = 39.37 Inch
To convert meter to Inch,multiply the meter value by 39.37.
Result in Inches: 58 m × 39.37 × in/m
Cancel The Comman factor of m
Result in Inches: (58 * 39.37 in)
Multiply 2283.46 into 39.37
∴ 58 meter = 2283.46 inches
Unit Conversion of 8 ft = 96.0 in
8 Foot is 96.0 inches
To convert Foot to Inches
we know that, 1 Foot = 12 inches
To convert Foot to inches, multiply the foot value by 12.
Result in Foot: 8 ft × 12 × in/ft
Cancel The Comman factor of ft
Result in Inches: (8 x 12 in)
Multiply 8 into 12
Result in Inches: 96.0 inches
∴ 8 Foot = 96.0 inches
A=($96.0 \cdot2283.46+96.0$$\sqrt{(\frac{2283.46}{2})^2+(3)^2}$$+2283.46$$\sqrt{(\frac{96.0}{2})^2+(3)^2}$) in
Simplify each term.
Multiply 96.0 in by 2283.46 in
A = $219212.16+96.0$$\sqrt{(\frac{2283.46}{2})^2+(3)^2}$$+2283.46$$\sqrt{(\frac{96.0}{2})^2+(3)^2}$
Square root of $\sqrt{(\frac{2283.46}{2})^2+(3)^2}$ is 1141.7339414
Put The values in Area Formula:
A= $219212.16+ 96.0 \cdot 1141.7339414+2283.46$$\sqrt{(\frac{96.0}{2})^2+(3)^2}$
Square Root of $\sqrt{(\frac{96.0}{2})^2+(3)^2}$ is 48.0936586
Put The values in Area Formula:
A= 219212.16 + (96.0 x 1141.7339414) + (2283.46 x 48.0936586)
Multiply 96.0 and 1141.7339414
A= 219212.16 + 109606.4583725 + (2283.46 x 48.0936586)
Multiply 2283.46 and 48.0936586
A= 219212.16 + 109606.4583725 + 109819.9457253
Add 219212.16 and 109606.4583725
A= 328818.6183725 + 109819.9457253
A=$438638.5640978$ in2
∴ The Surface Area of Pyramid length 8 ft , width 58 m and height 3 in is 438638.5640978 in2
or
Unit Conversion of 8 ft = 2.4384 m
8 Foot is 2.4384 meters
To convert Feet to Meter
we know that, 1 Foot = 0.3048 Meter
To convert Foot to meters, multiply the feet value by 0.3048.
Result in Meter: 8 ft × 0.3048 × m/ft
Cancel The Comman factor of ft
Result in Meters: (8 x 0.3048 m)
Multiply 8 into 0.3048
Result in Meters: 2.4384 meters
∴ 8 Foot = 2.4384 meters
Unit Conversion of 3 in = 0.0762 m
3 inches is 0.0762 meters
To convert inches to meter
we know that, 1 inch = 0.0254 meters
To convert inches to meter,multiply the inches value by 0.0254.
Result in Inches: 3 in x 0.0254 × m/in
Cancel The Comman factor of m
Result in Meters: (3 x 0.0254 m)
Multiply 3 into 0.0254
Result in meters: 0.0762 meters
∴ 3 inches = 0.0762 meters
A=($2.4384 \cdot58+2.4384$$\sqrt{(\frac{58}{2})^2+(0.0762)^2}$$+58$$\sqrt{(\frac{2.4384}{2})^2+(0.0762)^2}$) m
Simplify each term.
Multiply 2.4384 m by 58 m
A = $141.4272+2.4384$$\sqrt{(\frac{58}{2})^2+(0.0762)^2}$$+58$$\sqrt{(\frac{2.4384}{2})^2+(0.0762)^2}$
Square root of $\sqrt{(\frac{58}{2})^2+(3)^2}$ is 29.0001001
Put The values in Area Formula:
A= $141.4272+ 2.4384 \cdot 29.0001001+58$$\sqrt{(\frac{2.4384}{2})^2+(0.0762)^2}$
Square Root of $\sqrt{(\frac{2.4384}{2})^2+(0.0762)^2}$ is 1.2215789
Put The values in Area Formula:
A = 141.4272 + (2.4384 x 29.0001001) + (58 x 1.2215789)
Multiply 2.4384 and 29.0001001
A = 141.4272 + 70.7138441 +(58 x 1.2215789)
Multiply 58 and 1.2215789
A= 141.4272 + 70.7138441 + 70.8515779
Add 141.4272 and 70.7138441
A = 212.1410441 + 70.8515779
A= 282.992622 m2
∴ The Surface Area of Pyramid length 8 ft , width 58 m and height 3 in is 282.992622 m2