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Diagonal of Parallelogram Formula: Definition and Examples | EDU.COMEDU.COMResourcesBlogGuidePodcastPlanBackHomesvg]:size-3.5">Math Glossarysvg]:size-3.5">Diagonal of Parallelogram FormulaDiagonal of Parallelogram Formula: Definition and ExamplesTable of ContentsDiagonals of a Parallelogram Formula Definition of Diagonals in a Parallelogram

In a parallelogram, diagonals are line segments that join two non-adjacent vertices. A parallelogram, which is a quadrilateral with opposite sides that are parallel and equal, has two diagonals. These diagonals connect the opposite vertices of the parallelogram and bisect each other at their point of intersection.

Diagonals of different types of parallelograms have distinct properties. In a square, the diagonals bisect each other at right angles. In a rectangle, the diagonals bisect each other but not at right angles. In a rhombus, the diagonals are perpendicular to each other. Additionally, each diagonal divides the parallelogram into two congruent triangles.

Examples of Diagonals in a Parallelogram Example 1: Finding Diagonal Lengths with Side Lengths and Angle Problem:

Determine the length of diagonals of a parallelogram with side lengths 444 ft, 888 ft, and angle 60∘60^{\circ}60∘.

Step-by-step solution:

Step 1, Write down what we know from the problem.

Here x =4= 4=4 ft & y =8= 8=8 ft m∠A=60∘\text{m} \angle \text{A} = 60^{\circ}m∠A=60∘

Step 2, Use the formula to find the first diagonal p.

Formula for calculating the length of diagonals is given as, p=x2+y2  −  2xy  cosAp = \sqrt{x^{2} + y^{2}\;-\;2xy\; cosA}p=x2+y2−2xycosA​ =42+82  −  2(4)(8)  cos(60∘)= \sqrt{4^{2} + 8^{2} \;-\; 2(4)(8)\; cos(60^{\circ})}=42+82−2(4)(8)cos(60∘)​ =6.92= 6.92=6.92 ft

Step 3, Use the formula to find the second diagonal q.

q=x2+y2+2xy  cosAq = \sqrt{x^{2} + y^{2} + 2xy\; cosA}q=x2+y2+2xycosA​ =42+82+2(4)(8)  cos(60∘)= \sqrt{4^{2} + 8^{2} + 2(4)(8)\; cos(60^{\circ})}=42+82+2(4)(8)cos(60∘)​ =10.58= 10.58=10.58 ft Example 2: Finding Diagonal Lengths with Smaller Measurements Problem:

Determine the length of diagonals of a parallelogram with sides 333 inches and 666 inches, and the interior angle is 30°30°30°.

Step-by-step solution:

Step 1, Identify what we know from the problem.

Here, x =3= 3=3 inches & y =6= 6=6 inches Also, m  ∠A=30∘\text{m}\;\angle\text{A} =30^{\circ}m∠A=30∘

Step 2, Use the formula to find the first diagonal p.

Formula for calculating the length of diagonals of the parallelogram is given as, p=x2+y2  −  2xy  cosAp = \sqrt{x^{2} + y^{2}\;-\;2xy\; cosA}p=x2+y2−2xycosA​ =32+62  −  2(3)(6)  cos  30∘= \sqrt{3^{2} + 6^{2}\;-\;2(3)(6)\; cos\;30^{\circ}}=32+62−2(3)(6)cos30∘​ =3.71= 3.71=3.71 inches

Step 3, Use the formula to find the second diagonal q.

q=x2+y2+2xy  cosAq = \sqrt{x^{2} + y^{2} + 2xy\; cosA}q=x2+y2+2xycosA​ =32+62+2(3)(6)  cos  (30∘)= \sqrt{3^{2} + 6^{2} + 2(3)(6)\; cos\;(30^{\circ})}=32+62+2(3)(6)cos(30∘)​ =8.72= 8.72=8.72 inches Example 3: Using the Relationship Between Sides and Diagonals Problem:

Determine the length of a diagonal of a parallelogram with a side length of 555 ft and 888 ft if the length of another diagonal is 101010 ft.

Step-by-step solution:

Step 1, Write down what we know from the problem.

Given: x =5= 5=5 ft, y =8= 8=8 ft & p =10= 10=10 ft

Step 2, Choose the right formula to use. As we know, the length of two sides and one diagonal is given for finding the length of another diagonal. We will use the formula of the relationship between the sides and diagonals of a parallelogram.

Step 3, Apply the formula to find the unknown diagonal q. By using the formula,

p2+q2=2(x2+y2)p^{2} + q^{2} = 2(x^{2} + y^{2})p2+q2=2(x2+y2) ⇒102+q2=2(52+82)\Rightarrow 10^{2} + q^{2} = 2(5^{2} + 8^{2})⇒102+q2=2(52+82) ⇒100+q2=2(25+64)\Rightarrow 100 + q^{2} = 2(25 + 64)⇒100+q2=2(25+64) ⇒100+q2=178\Rightarrow 100 + q^{2} = 178⇒100+q2=178 ⇒q2=178  −  100\Rightarrow q^{2} = 178\;-\;100⇒q2=178−100 ⇒q2=78\Rightarrow q^{2} = 78⇒q2=78

Step 4, Find the final answer by taking the square root. By taking a square root,

⇒q=8.83\Rightarrow q = 8.83⇒q=8.83 ft Comments(2)BBasketballAficionadoPennyNovember 4, 2025I've been struggling to explain this to my students. This glossary page made it so much easier! Thanks for the clear formulas and examples.

NNatureLover89September 17, 2025I’ve used the Diagonal of Parallelogram Formula page to help my kids with their geometry homework. The examples are super clear, and it’s great for explaining tricky concepts in a simple way!

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