Math, asked by dilli9211, 4 months ago

Calculate the volume of the cuboids whose dimensions are given below.
a) I = 20 cm, b = 13 cm, h = 6 cm​

Answers

Answered by riyagarg1007
1

Answer:

volume of cuboid=L×B×H

=(20×13×6)cm

=156,0 cm³

Answered by INSIDI0US
25

Step-by-step explanation:

Question :-

  • Find the volume of cuboid whose dimensions are 20 cm × 13 cm × 6 cm respectively.

To Find :-

  • Volume of cuboid.

Solution :-

Given :

  • Length = 20 cm
  • Breadth = 13 cm
  • Height = 6 cm

By using the formula,

{\longrightarrow{\sf Volume\ of\ cuboid\ =\ l \times b \times h}}

Where,

  • l = length
  • b = breadth
  • h = height

According to the question, by using the formula, we get :

{\longrightarrow{\sf Volume\ of\ cuboid\ =\ l \times b \times h}}

{\longrightarrow{\sf 20 \times 13 \times 6}}

{\longrightarrow{\sf 1,560\ cm^3}}

\therefore Hence, volume of cuboid is 1,560 cm³.

More To Know :-

\begin{array}{|c|c|c|}\cline{1-3}\bf Shape&\bf Volume\ formula&\bf Surface\ area formula\\\cline{1-3}\sf Cube&\tt l^3}&\tt 6l^2\\\cline{1-3}\sf Cuboid&\tt lbh&\tt 2(lb+bh+lh)\\\cline{1-3}\sf Cylinder&\tt {\pi}r^2h&\tt 2\pi{r}(r+h)\\\cline{1-3}\sf Hollow\ cylinder&\tt \pi{h}(R^2-r^2)&\tt 2\pi{rh}+2\pi{Rh}+2\pi(R^2-r^2)\\\cline{1-3}\sf Cone&\tt 1/3\ \pi{r^2}h&\tt \pi{r}(r+s)\\\cline{1-3}\sf Sphere&\tt 4/3\ \pi{r}^3&\tt 4\pi{r}^2\\\cline{1-3}\sf Hemisphere&\tt 2/3\ \pi{r^3}&\tt 3\pi{r}^2\\\cline{1-3}\end{array}

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