WebEach side of a rhombus is 10 cm and diagonals is 16 cm. What is the length of other diagonal and hence find the area of rhombus? draw the other diagonal. then the diagonals of a rhombus bisect each other perpendicularly. so Let’s take Triangle u001eu001fABO (I am considering AC = 16 cm) AB = 10 cm is the hypotenuse WebAug 7, 2024 · Given the length of diagonal ‘d1’ of a rhombus and a side ‘a’, the task is to find the area of that rhombus. A rhombus is a polygon having 4 equal sides in which both the opposite sides are parallel, and opposite …
In a rhombus if d1 = 16 cm, d2 = 12 cm, its area will be… - Brainly
WebFormula of rhombus side in terms of its diagonals: Side of rhombus, say, s= { (d1)^2+ (d2)^2} /2 Where d1 and d2 are diagonals of rhombus. d1=16cm, d2=30cm, Sum of their sq. =256+900=1156. Now ,s=√ ( 1156/4) = √289=17cm Aritra Bhattacharya Just a 12th Standard Student From India Author has 117 answers and 144.8K answer views Updated 4 y Related WebIn a rhombus if d 1 = 16 cm, d 2 = 12 cm, its area will be 96 cm². Concept: Areas of Similar Triangles Report Error Is there an error in this question or solution? My Profile [view full … simulation of car crash
In a rhombus if d1 = 16 cm, d2 = 12 cm, its area will be ...
WebJan 16, 2024 · The three formulas to find area depend on information you know about the rhombus. If you know Altitude (height) and side s the formula is: a r e a = h e i g h t × s. area=height\times s area = height × s. If you know the length of one side s and the measure of one angle the formula is: WebAs such the rhombus is. A = 1/2 (D1 × D2) Sq. Web area and perimeter of a rhombus. Area = altitude × s. The perimeter of rhombus equals to 120 and one of the angles is 30 degree. Therefore, Side Of Rhombus = P/4. Area = (p^2 sin theta)/16 where p is the length of the perimeter and theta is one of the internal angles of the rhombus. WebIn a rhombus if d1 = 16 cm, d2 = 12 cm, then the length of the side of the rhombus is (a) 8 cm (b) 9 cm (c) 10 cm (d) 12 cm (c) 10 cm Q12. In ABC, DE AB. If CD = 3 cm, EC = 4 cm, … simulation needs assessment