A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n
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- Опубліковано 15 вер 2024
- #matholympiadquestion #exponential #exponentialequation #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
#matholympiadquestion #exponential #exponentialequation #matholympiadtraining #matholympiadpreparation #matholympiad #olympiad #olympiadquestion #geometry
#matholympiadquestion #exponential #exponentialequation #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
A Good Math Olympiad Geometry Challenge | Math Olympiad Questions | Solve for n #geometry #algebra
#matholympiadquestion #exponential #exponentialequation #matholympiadtraining #matholympiadpreparation #matholympiad #olympiad #olympiadquestion #geometry
Infinite number of solutions unless you specify that all sides of the triangle must be natural numbers.
You are a genius and so sweet ♥️♥️🥰🥰
Just by looking at the two given attributes, there's an Infinite number of solutions because the value of (a) can be any positive number and the angles formed with the hypotenuse can be any angle based upon the value of (a).
You are a genius and so sweet ♥️♥️🥰🥰
Draw a horizontal line 101 units long. Now, draw a vertical line perpendicular from the left hand point. Any triangle formed by drawing a line from the right hand end to any point on the vertical line is a valid solution as per the statement of the problem (and conforms to the initial diagram). Ergo, an infinite number of solutions.
In fact there are an infinite number of solutions
You are a genius and so sweet ♥️♥️🥰🥰
You did not mention that the sides should be integers.
Either you don't know math or just trying to make a quick buck
50 x 204,02 = 10201.
You are a genius and so sweet my friend 🥰🥰♥️♥️♥️
This does not follow the general rule for the sides of a triangle... [a+b>c AND b+c>a AND c+a>b]
wonderfully explained.
You are a genius and so sweet ♥️♥️🥰🥰
The solution is not real. It is based on assumptions that do not rise to reality. Assignment of the values as done is a logic error.