Yes.
I have to prove http://s5.tinypic.com/19ldma.jpg http://img22.imageshack.us/img22/9263/mathhlproofou4.jpg without using pythagorean theorem
The distance formula using Pythagorean theorem: trig values trig formulas triangle abc trigonometric concepts trigonometric formulas.
Yes is you are using only straight ines, no if you are using arc segments.
If the sides of a right angle triangle are 6 feet and 8 feet then by using Pythagoras' theorem the hypotenuse will be 10 feet
You can calculate this using the Pythagorean formula for a right triangle.
Pythagoras' theorem states that for any right angle triangle the square of its hypotenuse is equal to the sum of its squared sides as in the following formula:- a squared + b squared = c squared whereas a and b are the sides of the triangle with c being its hypotenuse
Assuming you are talking about a rectangular area, the diagonal would be found using the Pythagorean Theorem. 5^2 + 10^2 = d^2, so 125 = d^2, then take square root of both sides. This means the diagonal is approximately 11.18 feet. It is exactly 5√5 feet.
By using Pythagoras' theorem.
Using Pythagoras' theorem: 425
you take the horizontal distance between the points and square it, then add that to the square of the vertical distance. Now take the square root of the sum. You are really just making a triangle an using the pythagorean theorem.Read more: What_does_the_distance_formula_look_like
It is a quadratic equation and its solutions can be found by using the quadratic equation formula.
If it's the dimensions of a rectangle then by using Pythagoras' theorem its diagonal is 40
It is the distance between opposite corners and it can be worked by using Pythagoras' theorem.
Let's A and x represent the given vertex angle and the base, respectively.Use the law of cosine to find the length of the legs of the triangle by doing x2 = m2 + n2 - 2mncos A, where m and n are the legs. Since the triangle is isosceles, m = n and therefore x2 = 2m2 - 2m2cos A. Solving for m gives m = sqrt(x2/(2 - cos A))Get the height of the triangle by using Pythagorean theorem. m2 = x2 + h2, where h is the height.Finally, get the area using the formula for a triangle's area, which is (base * height) / 2.
Using Pythagoras' theorem it is 40 feet
Using the quadratic formula, I found the solution set is x=2,x=-9