The length of line segment OM is 34 cm.
<u>Step-by-step explanation</u>:
- The diagonals of a parallelogram bisect each other (cuts equally into two halves).
- The line segment OM is a diagonal with an intersection point Q.
- The line segment OQ is equal in length as the line segment QM.
Step 1 :
⇒ length of OQ = length of QM
⇒ 2x + 3 = 3x -4
⇒ 3x-2x =4+3
⇒ x = 7
Step 2 :
Subsitute x = 7 in OQ and QM
⇒ length of OQ = 2x+3
⇒ 2(7) + 3 = 17 cm
⇒ length of QM = 3x-4
⇒ 3(7) - 4 = 17 cm
∴ Length of OM = length of OQ + length of QM
⇒ OM = 17+17 = 34 cm
<h3><u>Given</u>:-</h3>
- Volume 6,900 cm^3
- Length = 23 cm
- Width = 10cm
<h3><u>To Find</u>:-</h3>
<h3><u>Solution</u>:-</h3>
Where,
- » l denotes Length
- » w denotes Width
- » h denotes Height
Therefore , the Volume of the Box is 30 cm ³.
Answer:
An expression that is equal to 97/33 is <em>97 ÷ 33. </em>
Step-by-step explanation: