4 Weddings and a Funeral
4 Wings on a Fly
Written out f(w) = w^2 + 7w + 12 there is no particular answer since it depends on what w is equal to. normally this type of question is posited as "Solve for w with f(w) = 0?" or to change its form to (ax + b)(cx + d) if f(w) = w^2 + 7w + 12 and f(w) = 0 then 0 = w^2 + 7w + 12 simply look at the factors of 12 1 x 12 2 x 6 3 x 4 now consider (w + a)(w + b) = w^2 + aw + bw + ab = w^2 + (a+ b)w + ab since you know 3 x 4 = 12 , and 3 + 4 = 7 this give you 0 = (w + 3) (w + 4) or f(w) = (w + 3)(w + 4) solving for zero w = either -3 or -4 as (-3 + 3)(-3 + 4) = (0)(1) = 0 or (-4 + 3)(-4 + 4) = (-1)(0) = 0 so depending on what you are actually looking for the answer is w^2 + 7w +12 = (w + 3)(w + 4) or -3 and -4
F. W. Harvey was born in 1888.
The full name of F. W. Woolworth was Frank Winfield Woolworth.
F. W. Harvey died in 1957.
F. W. Winterbotham was born in 1897.
In the English edition there are five letters all worth 4 points each, they are F, H, V, W and Y. The letters F, H, V, W and Y are worth 4 points.
W = F x d Therefore d = W/F d = 500 / 125 = 4 meters
W. F. McMahon has written: '\\'
F. W. Kenyon was born in 1912.
F. W. Dupee was born in 1904.