Question

find the height of a cuboid who's base's area is 80 cm and volume is 3600 cm

Answer 1

Answer:

The height of the cuboid is 40cm

Step-by-step explanation:

The base of the cuboid is rectangular in shape

The area of the rectangular base = l×b

l×b = 80 ( equation 1)

volume of a cuboid = l×b×h

3600= 80× h ( from eq 1)

h = 3600/80

h = 40 cm

Answer 2

Answer:

The Height of the cuboid is 45 cm.

Step-by-step explanation:

Given :

Base area = 80 cm²

Volume = 3600 cm³

To find :

The height of the cuboid

Solution :

$\boxed{\sf{Volume=Length \times Breadth \times Height}}$

$\sf{\implies} \: l \times b \times h = 3600$

Base of Cuboid is Rectangle. Area of Rectangle is Length × Breadth. The area is 80 cm², l × b for Volume is 80 cm².

$\sf{\implies} \: 80 \times h = 3600 \\ \\ \sf{\implies} \: h = \dfrac{3600}{80} \\ \\ \sf{\implies} \: h = 45$

Height = 45 cm

$\therefore$ The Height of the cuboid is 45 cm.