The vector sum of two vectors of magnitudes 10 units and 15 units can never be

The dot product of two vectors of magnitudes 3 units and 5 units cannot be :- (i) -20 (ii) 16 (iii) -10 (br) 14

Two vectors of magnitudes 10 and 15 units can never have a resultant equal to

The resultant of two vectors of magnitudes 3 units and 5 units is perpendicular to 3 units.The angle between the vectors is

The resultant of two vectors of magnitude 3 units 4 units is 1 unit. What is the value of their dot product. ?

Angle between two vectors of magnitudes 12 and 18 units, when their resultant is 24 units, is

The maximum and minimum magnitude of the resultant of two vectors are 17 units and 7 units respectively. Then the magnitude of the resultant of the vectors when they act perpendicular to each other is :

The maximum and minimum magnitude of the resultant of two given vectors are 17 units and 7 units respectively. If these two vectors are at right angles to each other, the magnitude of their resultant is

The maximum and minimum magnitudes of the resultant of two vectors are 23 units and 7 units respectively. If these two vectors are acting at right angles to each other, the magnitude of their resultant will be

Two vectors A and B have magnitudes 6 units and 8 units respectively. Find |A-B|, if the angle between two vectors is .(a) 0^(@) (b) 180^(@) (c) 180^(@) (d) 120^(@) .