Subject :IMO Class : Class 6
Subject :IMO Class : Class 7
State 'T' for true and 'F' for false.
(i) In the given right-angled triangle ABC, ∠B = 65°, ∠C = 25°, then AB2 = BC2 + CA2.
(ii) The length of the third side of a triangle cannot be smaller than the difference of the lengths of any two sides.
(iii) A triangle can have only one median.
(i) | (ii) | (iii) | |
A | F | F | T |
B | F | T | F |
C | F | T | T |
D | F | F | F |
answer is b
Ans 5:
Class : Class 8
yeah guys !!!! the answer is B.....not D. it is so obvious, the second statement is true....the solution given by the website makes no sense.!
Ans 6:
Class : Class 8
here in the 3rd statement it's written that any 2 sides not the other 2 sides.
Ans 15:
Class : Class 6
According to their own solution b is a supposed to be correct but the answer given is d???
Ans 19:
Class : Class 9
hey guys the ans cannot be optiob B because in the second statement it is told that the third side cannot be smaller than the difference of the other two sides that means the third side can be equal or greater than the difference. but it cannot be equal that is why 2nd statement id wrong
Ans 21:
Class : Class 8
The answer is actually supposed to be Option B rather than Option D because the second statement is true
Ans 26:
Class : Class 10
The answer should be b. This sum is there in the IMO Workbook and there the answer is b
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Subject :IMO Class : Class 4
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Subject :IMO Class : Class 5
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Subject :IMO Class : Class 7
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Subject :IMO Class : Class 4
Ans 7:
Class : Class 4
its confusing, actually it is supposed to have 5 different notebooks and 3 different pens so 5*3=15
Ans 8:
Class : Class 5
Answer is C as the question says the combinations of 1 notebook and 1 pen from 5 notebooks and 3 pens, which is 5*3=15.
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Subject :IMO Class : Class 8
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Subject :IMO Class : Class 8
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Subject :IMO Class : Class 4
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Subject :IMO Class : Class 9