The answer will depend on whether you meant (32p)3 or 32p3
If (32p)3 then the answer is 128p*sqrt(2p)
If 32p3, then the answer is 4p*sqrt(2p)
root of p = 67 square both sides p = 67 times 67 =4,489
A=s2 64=s2 s=8 units P=4s P=4(8) P=32 units Therefore, the perimetre is 32 units.
To cube something is to raise to the third power. P cubed would be p^3
Yes, the square root of 31 is an irrational number. Rational numbers are those which can be expressed in the form of p/q(where p, q are integers and q ≠0). Square root of 31 has non-terminating and non-repeating decimal so it can't be expressed in the form of p/q.
Only if p and q are DIFFERENT primes.
p=9
Yes, the square root is equivalent to an exponent of 1/2.Suppose the exponent is a rational number of the form p/q where p and q are integers and q > 0. Then x^(p/q) = (the qth root of x) raised to the power p or, equivalently, (the qth root of (x raised to the power p).
root of p = 67 square both sides p = 67 times 67 =4,489
p2
18p = the square root of 3600 18p = 60 p = 60/18 p = 3 and a 1/3
One cannot get the square root of an item. However if you want to quantify this item: The square root of the moon = the square root of (1) the moon. The square root of (1) moon is still one moon as the root of 1 is still one :P
By an indirect proof. Assuming the square root is rational, it can be written as a fraction a/b, with integer numerator and denominator (this is basically the definition of "rational"). If you square this, you get a2/b2, which is rational. Hence, the assumption that the square root is rational is false.
The inner space quality if pi over 7.27 divided by the square root of 7 over 32 mutiplied by P/67.894563535245
A=s2 64=s2 s=8 units P=4s P=4(8) P=32 units Therefore, the perimetre is 32 units.
To cube something is to raise to the third power. P cubed would be p^3
Square root of 53 is simlipfied in decimal form as √53 = 7.280. Square root of 53 cannot be expressed as a fraction in the form p/q which tells us that the square root of 53 is an irrational number.
P cubed