Given the other two sides of a right angled triangle, the task is to find it’s hypotenuse.
Examples:
Input: side1 = 3, side2 = 4
Output: 5.00
32 + 42 = 52
Input: side1 = 12, side2 = 15
Output: 19.21
Approach: Pythagoras theorem states that the square of hypotenuse of a right angled triangle is equal to the sum of squares of the other two sides.
Below is the implementation of the above approach:
C++
// C++ implementation of the approach #include<bits/stdc++.h> #include <iostream> #include <iomanip> using namespace std;
// Function to return the hypotenuse of the // right angled triangle double findHypotenuse( double side1, double side2)
{ double h = sqrt ((side1 * side1) + (side2 * side2));
return h;
} // Driver code int main()
{ int side1 = 3, side2 = 4;
cout << fixed << showpoint;
cout << setprecision(2);
cout << findHypotenuse(side1, side2);
} // This code is contributed by // Surendra_Gangwar |
Java
// Java implementation of the approach class GFG {
// Function to return the hypotenuse of the
// right angled triangle
static double findHypotenuse( double side1, double side2)
{
double h = Math.sqrt((side1 * side1) + (side2 * side2));
return h;
}
// Driver code
public static void main(String s[])
{
int side1 = 3 , side2 = 4 ;
System.out.printf( "%.2f" , findHypotenuse(side1, side2));
}
} |
Python3
# Python implementation of the approach # Function to return the hypotenuse of the # right angled triangle def findHypotenuse(side1, side2):
h = (((side1 * side1) + (side2 * side2)) * * ( 1 / 2 ));
return h;
# Driver code side1 = 3 ;
side2 = 4 ;
print (findHypotenuse(side1, side2));
# This code contributed by Rajput-Ji |
C#
// C# implementation of the approach using System;
class GFG
{ // Function to return the hypotenuse
// of the right angled triangle
static double findHypotenuse( double side1,
double side2)
{
double h = Math.Sqrt((side1 * side1) +
(side2 * side2));
return h;
}
// Driver code
public static void Main()
{
int side1 = 3, side2 = 4;
Console.Write( "{0:F2}" , findHypotenuse(side1,
side2));
}
} // This code is contributed // by Princi Singh |
Javascript
<script> // java script implementation of the approach // Function to return the hypotenuse of the //right angled triangle function findHypotenuse(side1, side2){
let h = (((side1 * side1) + (side2 * side2))**(1/2));
return h;
} // Driver code let side1 = 3; let side2 = 4; document.write(findHypotenuse(side1, side2).toFixed(2)); // This code is contributed by Gottumukkala Bobby </script> |
Output
5.00
Time Complexity: O(log(2*(s2)) where s is the side of the rectangle. because time complexity of inbuilt sqrt function is O(log(n))
Auxiliary Space: O(1)