In the equation m = k + 3, m is the:
123=839+03933=4994=4849399 what grade are you in
M=k+
k=275 First find the prime factorization of 2750 and 360: 2750=2*53*11 360=23*3*5 Now you want the smallest positive integers, k and m, such that: 23*3*5*k=2*53*11*m In order for the two sides of the equation to be equal, the right-hand side of the equation must contain the prime factors on the left-hand side to the same power as the prime factors on the left-hand side. The smallest integer value of m for which this is true is: m=22*3 Now solve for k: 23*3*5*k=2*53*11*22*3 k=(2*53*11*22*3)/(23*3*5)=52*11=275
(k*m)3 = k3*m3
m-15=3 m-15+15=3+15 m=3+15 m=18
2
Assuming that you meant that the equation is y=3x+1, the slope is 3. This is because the equation of any line in the form of y=mx+b has a slope of "m". Therefore, the value of m in this equation is 3.
The equation given is not enough to solve for k, m, and n as it has 3 unknowns and only 1 equation. You need at least 2 or more equations to solve for the unknowns.
K is two times m add 1 k = (2 m ) + 1 k=2m+1
k=275 First find the prime factorization of 2750 and 360: 2750=2*53*11 360=23*3*5 Now you want the smallest positive integers, k and m, such that: 23*3*5*k=2*53*11*m In order for the two sides of the equation to be equal, the right-hand side of the equation must contain the prime factors on the left-hand side to the same power as the prime factors on the left-hand side. The smallest integer value of m for which this is true is: m=22*3 Now solve for k: 23*3*5*k=2*53*11*22*3 k=(2*53*11*22*3)/(23*3*5)=52*11=275
Rate = k[A]m[B]n
(k*m)3 = k3*m3
No, it is not m. The answer is 9, which has the equation 6+3.
First rearrange the second equation to fit the form y = mx + c, where m = slopeWe get y = (9/k) x - 7/kParallel lines have the same slope. From equation 1, slope = kFrom equation 2, slope = 9/k . Equating the two slopes we get k = 9/k; k² = 9; k = 3
The period of a wave is the reciprocal of the frequency. ( '1' divided by the frequency)
If the slope is m, then the equation is y - 7 = m*(x + 3)
m-15=3 m-15+15=3+15 m=3+15 m=18
M-K-3 - 2000 TV was released on: USA: 2000
It is normal to try to isolate the required unknown by dividing both sides of the equation by the unwanted factors which share that side of the equation. So, if k = lmn then we need to divide both sides by ln. Thus we get k/ln = m The it is normal to swap the sides so that the required unknown is on the left-hand side m = k/ln