Now, we convert \(\frac{63}{50}\) to a mixed number: 4 1/5 = 4.2 (1/5 = 0.2) 3/10 = 0.3. Converting the mixed number to an improper fraction, 4 1/5 becomes 21/5.
Nina's Garden (2022) (2022)
What is the area of nina's garden get the answers you need, now!
Nina's garden is 4 1/5 meters long and 3/10 meter wide.
Final answer the area of nina’s garden is \(. \[ 63 \div 50 = 1 \quad \text{with a remainder of } 13 \] so, \(\frac{63}{50} = 1 \frac{13}{50}\). To calculate the area, carry out the. The area of nina's garden is 63/50 square meters.
The length of nina's garden is 4 (1)/ (5) meters, which can be expressed as the improper fraction. To find the area of nina's garden, we need to multiply the length by the width. 4.2 x 0.3 = 1.26 square. Nina's garden has a length of \(4 \frac{1}{5}\) meters and a width of \(\frac{3}{10}\) meters.
\[ 4 \frac{1}{5} = \frac{4 \times 5 + 1}{5} =.
In nina's case, the garden's length is 4 1/5 meters (which is equal to 4.2 meters) and its width is 3/10 meters (which is equal to 0.3 meters). What is the area of the garden? Now, multiply 21/5 (length) by 3/10. First, convert \(4 \frac{1}{5}\) to an improper fraction:
In nina's case, her garden is 4 1/5 meters long and 3/10 meter wide. Area of rectangular garden = 21/5[tex]\times[/tex]3/10 = 63/50 =1 [tex]\times \\[/tex] 13/50 [tex]m^{2}[/tex] = 1.26 [tex]m^{2}[/tex] consider nina' s garden is rectangular in shape. To find the area of nina's garden, we need to multiply its length by its width:
