square root of c to the second power is c
C squared times the square root of 5cd over 2 times d to the third power
33
This question cannot be answered. You will have to give me the number to the square root. * * * * * a = ±sqrt(c^2 - b^2)
If it's a right triangle, a2 + b2 = c2 3 + 5 = c2 c = the square root of 8.
square root of c to the second power is c
C squared times the square root of 5cd over 2 times d to the third power
33
This question cannot be answered. You will have to give me the number to the square root. * * * * * a = ±sqrt(c^2 - b^2)
It's the square root of a2+b2. It cannot be simplified. It is NOT a+b. The answer is c square.
5
In order to solve this equation you will use the Pathagorean Theorem. [(A^2+B^2=C^2) "^2" being square root] Here are the steps to solve for C with A=36 and B=12; A^2+B^2=C^2Now let's solve for C... C=(square root of) A^2+B^2 Then we enter in our known values... C=(square root of) 36^2 + 12^2Next we square 36 and 12, giving us 1,296 and 144... C=(square root of) 1,296+144 Almost there! Now add the two numbers and find the square root using your scientific calculator. C=(square root of) 1,440 which is... C=37.94733 And there you have it. Your missing side is 37.95 (rounded). I hope you found this information helpful.
If it's a right triangle, a2 + b2 = c2 3 + 5 = c2 c = the square root of 8.
Square root is the same as raise to the 1/2 power, so multiply the exponents {(ab)c = abc}, so sqrt(x^3) = (x3)1/2 = x3/2
write a c program to accept a number and generate a square root cube and exponential values
The side is square root of 40.5. ( approximately 6.363961...) The diagonal is 6.363961...times the square root of 2, because of the Pythagorean formula of a^2+b^2=c^2 a^2+a^2=c^2 square has identical sides. 2a^2 =c^2 a * sqr 2=c square root both sides of the equation. a is the side of the square. So, 6.363961... times sqr 2= 9
The integral of cot (x) dx is ln (absolute value (sin (x))) + C. Without using the absolute value, you can use the square root of the square, i.e. ln (square root (sin2x)) + C