two forces are of magnitude 450N and 240N respectively determine the maximum magnitude of the resultant force.
If they are both in the same direction that is as big as it gets
450 + 240 = 690
Raven, Connexus or not, your question above this one makes no sense.
To determine the maximum magnitude of the resultant force, we need to find the vector sum of the two forces.
We can use the parallelogram rule or the triangle rule to find the resultant force.
Using the parallelogram rule:
Step 1: Draw a scale vector diagram of the two forces, noting the direction and magnitude of each force.
Step 2: Place the tail of the second vector at the head of the first vector, forming a parallelogram.
Step 3: Draw the vector from the tail of the first vector to the head of the second vector. This represents the resultant force.
Step 4: Measure the magnitude of the resultant force using a ruler or protractor.
Using the triangle rule:
Step 1: Draw a scale vector diagram of the two forces, noting the direction and magnitude of each force.
Step 2: Place the tail of the second vector at the head of the first vector, forming a triangle.
Step 3: Draw the vector from the tail of the first vector to the head of the second vector. This represents the resultant force.
Step 4: Measure the magnitude of the resultant force using a ruler or protractor.
Depending on the angle and direction of the forces, the maximum magnitude of the resultant force can vary.
To determine the maximum magnitude of the resultant force, we need to add the magnitudes of the two forces and find the maximum value.
Given that the magnitude of the first force is 450N and the magnitude of the second force is 240N, we can add these two values together:
450N + 240N = 690N
Therefore, the maximum magnitude of the resultant force is 690N.