We should take the length and the expansiveness of the square shape be x m and y m. Thus, the edge \[=\text{ }2\left( x\text{ }+\text{ }y \right)\text{ }m\] \[104\text{ }=\text{ }2\left( x\text{...
The diagonal of a rectangle is 60 m more than its shorter side and the larger side is 30 m more than the shorter side. Find the sides of the rectangle.
How about we think about the more limited side of the square shape to be x m. Then, at that point, the length of the opposite side \[=\text{ }\left( x\text{ }+\text{ }30 \right)\text{ }m\] Length of...
The hypotenuse of a right-angled triangle exceeds one side by 1 cm and the other side by 18 cm; find the lengths of the sides of the triangle.
Leave the hypotenuse of the right triangle alone x cm. From the inquiry, we have Length of one side \[=\text{ }\left( x\text{ }\text{ }1 \right)\text{ }cm\] Length of opposite side \[=\text{ }\left(...
The sides of a right-angled triangle are (x – 1) cm, 3x cm and (3x + 1) cm. Find: (i) the value of x, (ii) the lengths of its sides, (iii) its area.
Given, The more drawn out side = \[Hypotenuse\text{ }=\text{ }\left( 3x\text{ }+\text{ }1 \right)\text{ }cm\] Furthermore, the lengths of other different sides are\[\left( x\text{ }\text{ }1...
The hypotenuse of a right-angled triangle is 26 cm and the sum of other two sides is 34 cm. Find the lengths of its sides
Given, a right triangle \[Hypotenuse\text{ }=\text{ }26\text{ }cm\] and the amount of other different sides is \[34\text{ }cm.\] Presently, let believe the other different sides to be \[x\text{...
The sides of a right-angled triangle containing the right angle are 4x cm and (2x – 1) cm. If the area of the triangle is 30 cm2; calculate the lengths of its sides.
Given, the space of triangle \[=\text{ }30\text{ }cm2\] As, x can't be negative, just \[x\text{ }=\text{ }3\] is substantial. Thus, we have \[AB\text{ }=\text{ }4\text{ }\times \text{ }3\text{...