find the area of a rectangular plot. one side of which is 48m and its diagnol is 50m About the author Adalyn
Answer: 672 [tex]m^2[/tex] Step-by-step explanation: We know, area of rectangle A = length (l) x Width (w) We also know that, the diagonal of a rectangle is obtained by, [tex]d = \sqrt{l^{2} + w^{2} }[/tex] So we have, [tex]w = \sqrt{d^{2} – l^{2} }[/tex] Where the values are given, l = 48 m and d = 50 m so we can have area by using these two values easily as follows: [tex]A = l \times \sqrt{d^{2} – l^{2} } \\= 48 \times \sqrt{50^{2} – 48^{2} } m^2\\= 48 \times 16 m^2\\= 672 m^2[/tex] Reply
Answer: To understand roads and subways at new places. To calculate distance between two places. To know whether there are two or more paths to the same place and which is the shortest. We can get information about mountains, rivers, valleys or any other thing, which may come on the way, and we can prepare for that. Reply
Answer: 672 [tex]m^2[/tex]
Step-by-step explanation:
We know,
area of rectangle A = length (l) x Width (w)
We also know that, the diagonal of a rectangle is obtained by,
[tex]d = \sqrt{l^{2} + w^{2} }[/tex]
So we have, [tex]w = \sqrt{d^{2} – l^{2} }[/tex]
Where the values are given,
l = 48 m and d = 50 m
so we can have area by using these two values easily as follows:
[tex]A = l \times \sqrt{d^{2} – l^{2} } \\= 48 \times \sqrt{50^{2} – 48^{2} } m^2\\= 48 \times 16 m^2\\= 672 m^2[/tex]
Answer:
To understand roads and subways at new places.
To calculate distance between two places.
To know whether there are two or more paths to the same place and which is the shortest.
We can get information about mountains, rivers, valleys or any other thing, which may come on the way, and we can prepare for that.