50 Pence to Cross the Clifton Suspension Bridge
3
Let call this number p and its factors q1,q2,q3,q4,q5 (qi are not necessary different) We know that there can't be more than 5 factors as 2^5=32 and 2^6=64 and 2 is the lowest possible factor. Lets try with q1=q2=...=q5=2 then p=2^5=32 If q1=q2=...=q4=2 and q5 = 3 then p=2^4 x 3 = 48 If q1=q2=...=q3=2 and q4=q5 = 3 then p=2^3 x 3^2 = 72 > 50 similarly p=2^2 x 3^3=108 > 50, p=2 x 3^4=162 > 50 If q1=q2=...=q3=2 and q4= 3 and q5=5 then p=2^3 x 3 x 5 > 2^3 x 3^2 > 50 The tries can continue with 2,3,5,7,11 but the number will be greater than 50 each time So the numbers with most factor between 1 and 50 are 32 and 48 The number between 1 and X that has the most factors has log2(X) factors
Double short black.
"Average" can mean many things. If what you're meaning is the root mean square, you can calculate the same as for a sine wave: integrate the square of the waveshape from 0 to the end of the first period, divide by the length of the period, and take the square root of this value. For a 50% square wave (it's at amplitude a for 50% of the cycle, and at 0 for the other 50%, so the integral will be over only 1/2 the period): sqrt[1/P * integral (a^2) dx, from 0 to 1/2*P] = sqrt[a^2/P * (x from 0 to 1/2*P)] sqrt[a^2 / P * (P/2) = a/sqrt(2) For 33.3%, integrate over 1/3 of the period, so RMS = a / sqrt(3).
l,p,p,p,p,p,,,,,,,
If p = 50 of q then q is 2% of p.
50 Pence Piece has 7 Sides
Hope you have fun with my Saleen S7div(15)shadow()1stColor(0,0,255)2ndColor(10,10,10)c(0,0,255)p(18,0,145)p(25,7,140)p(10,7,142)p(-10,7,142)p(-25,7,140)p(-18,0,145)c(0,0,255)p(50,-10,102)p(44,-10,120)p(34,-10,130)p(20,-8,133)p(10,-7,134)p(-10,-7,134)p(-20,-8,133)p(-34,-10,130)p(-44,-10,120)p(-50,-10,102)p(-50,-4,102)p(-44,-2,120)p(-39,0,130)p(-18,0,145)p(18,0,145)p(39,0,130)p(44,-2,120)p(50,-4,102)c(0,0,255)p(10,-7,134)p(20,-8,133)p(22,-19,110)p(35,-23,85)p(35,-24,75)p(35,-25,60)p(35,-25,52)p(25,-25,60)p(15,-25,63)p(0,-25,65)p(-15,-25,63)p(-25,-25,60)p(-35,-25,52)p(-35,-25,60)p(-35,-24,75)p(-35,-23,85)p(-22,-19,110)p(-20,-8,133)p(-10,-7,134)glass.p(21,-42,10).p(21,-43,15)p(22,-42,20)p(25,-35,35)p(32,-24,50)p(35,-25,52)p(25,-25,60)p(15,-25,63)p(0,-25,65)p(-15,-25,63)p(-25,-25,60)p(-35,-25,52)p(-32,-24,50)p(-25,-35,35)p(-22,-42,20).p(-21,-43,15).p(-21,-42,10)c(0,0,255)p(22,-39,-35)p(22,-41,-19)p(21,-42,5)p(21,-42,0)p(21,-43,5)p(22,-42,20)p(-22,-42,20)p(-21,-43,5)p(-21,-42,0)p(-21,-42,5)p(-22,-41,-19)p(-22,-39,-35)glassp(5,-26,-88)p(15,-26,-86)p(32,-26,-80)p(22,-39,-35)p(-22,-39,-35)p(-32,-26,-80)p(-15,-26,-86)p(-5,-26,-88)c(0,0,255)p(5,-26,-88)p(15,-26,-86)p(32,-26,-80)p(35,-26,-130)p(26,-25,-133)p(13,-25,-135)p(-13,-25,-135)p(-26,-25,-133)p(-35,-26,-130)p(-32,-26,-80)p(-15,-26,-86)p(-5,-26,-88)c(10,10,10)gr(35)p(13,-25,-135)p(26,-25,-133)p(35,-26,-130)p(46,-30,-130)p(52,-27,-130)p(50,-15,-130).p(46,0,-140).p(40,5,-140).p(26,5,-143).p(13,5,-145).p(-13,5,-145).p(-26,5,-143).p(-40,5,-140).p(-46,0,-140)p(-50,-15,-130)p(-52,-27,-130)p(-46,-30,-130)p(-35,-26,-130)p(-26,-25,-133)p(-13,-25,-135)c(0,0,255)gr(25)p(20,-15,-130).p(46,0,-130).p(40,5,-130)p(26,5,-133)p(13,5,-135)p(-13,5,-135)p(-26,5,-133).p(-40,5,-130).p(-46,0,-130)p(-20,-15,-130)c(50,50,50)p(55,10,60)p(55,10,-60)p(-55,10,-60)p(-55,10,60)c(50,50,50)p(40,10,100)p(40,10,60)p(-40,10,60)p(-40,10,100)c(50,50,50)p(40,10,-100)p(40,10,-60)p(-40,10,-60)p(-40,10,-100)c(50,50,50)p(40,10,-100)p(40,5,-130)p(26,5,-133)p(13,5,-135)p(-13,5,-135)p(-26,5,-133)p(-40,5,-130)p(-40,10,-100)c(50,50,50)gr(30)p(50,10,100)p(45,9,121)p(35,8,132)p(25,7,142)p(10,7,145).p(0,7,145)p(-10,7,145)p(-25,7,142)p(-35,8,132)p(-45,9,121)p(-50,10,100)//c(0,0,255)p(46,0,-100)p(40,10,-100)p(40,5,-130)p(46,0,-130)p(50,-15,-130)p(55,-15,-100)c(0,0,255)p(55,-27,-115)p(52,-27,-130)p(50,-15,-130)p(55,-15,-110)c(0,0,255)p(55,-4,60)p(55,-4,50)p(50,-4,40)p(54,-4,-20)p(45,-4,-40)p(45,-4,-50)p(45,10,-50)p(45,10,-40)p(54,10,-10)p(50,10,40)p(55,10,50)p(55,10,60)c(0,0,255)p(55,-4,60)p(55,-4,-60)p(45,-4,-60)p(45,-4,60)c(0,0,255)p(50,-4,49)p(50,-4,-30)p(50,-20,-40)p(50,-20,50)c(0,0,255)p(50,-4,49)p(50,-4,59)p(50,-10,60)p(50,-23,75)p(50,-20,60)p(50,-20,50)c(0,0,255)p(50,-4,-35)p(50,-4,-30)p(50,-20,-40)p(50,-20,-45)c(0,0,255)p(50,-4,-40)p(50,-4,-35)p(50,-20,-45)p(50,-20,-50)c(0,0,255)p(50,-4,-45)p(50,-4,-40)p(50,-20,-50)p(50,-20,-55)c(0,0,255)p(50,-4,-50)p(50,-4,-45)p(50,-20,-55)p(50,-20,-60)c(25,25,25)p(50,-4,-50)p(50,-20,-60)p(55,-20,-60)p(55,-4,-50)c(0,0,255)p(55,-4,-60)p(55,-20,-70)p(55,-20,-60)p(55,-4,-50)c(0,0,255).p(55,-23,-90).p(55,-20,-80).p(55,-20,-70)p(50,-20,-45)p(55,-20,-55).p(55,-25,-110)p(55,-20,-95)p(55,-15,-100)p(55,-15,-110)p(55,-27,-115)c(0,0,255)p(50,-20,50)p(50,-20,-40)p(46,-23,-40)p(46,-25,-40)p(46,-23,52)c(0,0,255)p(35,-24,52)p(35,-26,-40)p(46,-23,-40)p(46,-23,52)glassp(35,-24,45)p(28,-33,35)p(25,-40,20)p(24,-41,5)p(24,-40,0)p(24,-40,5)p(25,-39,-19)p(29,-33,-20)p(35,-26,-21)c(50,50,50)p(25,-39,-19)p(29,-33,-20)p(35,-26,-21)p(35,-26,-40)p(29,-33,-37)p(25,-37,-35)glassp(35,-26,-75)p(35,-26,-40)p(29,-33,-37)p(25,-37,-35)c(0,0,255)p(35,-24,45)p(28,-33,35)p(25,-40,20)p(24,-41,5)p(24,-40,0)p(24,-40,5)p(25,-39,-19)p(25,-37,-35)p(35,-26,-75)p(32,-26,-80)p(22,-39,-35)p(22,-41,-29)p(21,-42,5)p(21,-42,0)p(21,-43,5)p(22,-42,20)p(25,-35,35)p(32,-24,50)c(0,0,255)p(35,-26,-130)p(32,-26,-80)p(35,-26,-75)p(35,-26,-40)p(46,-23,-40)p(46,-30,-130)c(0,0,255)p(52,-27,-130)p(55,-27,-115)p(50,-20,-40)p(46,-23,-40)p(46,-25,-40)p(46,-30,-130)c(0,0,255)p(50,-20,50)p(50,-20,60)p(50,-23,75)p(50,-22,85)p(50,-20,92)p(50,-15,100)p(50,-10,102).p(45,-10,112)p(44,-10,120)p(34,-10,130)p(40,-20,110)p(22,-20,110)p(35,-28,85)p(35,-28,75)p(35,-25,60)p(35,-25,52)p(46,-23,52)c(2147483647,2147483647,2147483647)lightFgr(-40)p(20,-8,133)p(34,-10,130)p(40,-20,110)p(22,-20,110)c(0,0,255)p(50,10,100)p(48,9,110)p(47,-3,110)p(50,-4,102)c(0,0,255)p(45,9,118)p(48,9,110)p(47,-3,110)p(43,-2,118)c(0,0,255)p(45,9,118)p(36,9,125)p(39,0,125)p(43,-2,118)c(0,0,255)p(36,9,125)p(35,8,130)p(39,0,130)p(39,0,125)c(10,10,10)p(18,0,145)p(25,7,140)p(35,8,130)p(39,0,130).c(25,25,25)p(45,-4,-50)p(45,10,-50)p(55,10,-50)p(55,-4,-50).c(0,0,255)p(55,-4,-60)p(55,10,-60)p(55,10,-50)p(55,-4,-50)c(25,25,25)p(45,-4,-60)p(45,10,-60)p(55,10,-60)p(55,-4,-60)//c(0,0,255)p(-46,0,-100)p(-40,10,-100)p(-40,5,-130)p(-46,0,-130)p(-50,-15,-130)p(-55,-15,-100)c(0,0,255)p(-55,-27,-115)p(-52,-27,-130)p(-50,-15,-130)p(-55,-15,-110)c(0,0,255)p(-55,-4,60)p(-55,-4,50)p(-50,-4,40)p(-54,-4,-20)p(-45,-4,-40)p(-45,-4,-50)p(-45,10,-50)p(-45,10,-40)p(-54,10,-10)p(-50,10,40)p(-55,10,50)p(-55,10,60)c(0,0,255)p(-55,-4,60)p(-55,-4,-60)p(-45,-4,-60)p(-45,-4,60)c(0,0,255)p(-50,-4,49)p(-50,-4,-30)p(-50,-20,-40)p(-50,-20,50)c(0,0,255)p(-50,-4,49)p(-50,-4,59)p(-50,-10,60)p(-50,-23,75)p(-50,-20,60)p(-50,-20,50)c(0,0,255)p(-50,-4,-35)p(-50,-4,-30)p(-50,-20,-40)p(-50,-20,-45)c(0,0,255)p(-50,-4,-40)p(-50,-4,-35)p(-50,-20,-45)p(-50,-20,-50)c(0,0,255)p(-50,-4,-45)p(-50,-4,-40)p(-50,-20,-50)p(-50,-20,-55)c(0,0,255)p(-50,-4,-50)p(-50,-4,-45)p(-50,-20,-55)p(-50,-20,-60)c(25,25,25)p(-50,-4,-50)p(-50,-20,-60)p(-55,-20,-60)p(-55,-4,-50)c(0,0,255)p(-55,-4,-60)p(-55,-20,-70)p(-55,-20,-60)p(-55,-4,-50)c(0,0,255).p(-55,-23,-90).p(-55,-20,-80).p(-55,-20,-70)p(-50,-20,-45)p(-55,-20,-55).p(-55,-25,-110)p(-55,-20,-95)p(-55,-15,-100)p(-55,-15,-110)p(-55,-27,-115)c(0,0,255)p(-50,-20,50)p(-50,-20,-40)p(-46,-23,-40)p(-46,-25,-40)p(-46,-23,52)c(0,0,255)p(-35,-24,52)p(-35,-26,-40)p(-46,-23,-40)p(-46,-23,52)glassp(-35,-24,45)p(-28,-33,35)p(-25,-40,20)p(-24,-41,5)p(-24,-40,0)p(-24,-40,5)p(-25,-39,-19)p(-29,-33,-20)p(-35,-26,-21)c(50,50,50)p(-25,-39,-19)p(-29,-33,-20)p(-35,-26,-21)p(-35,-26,-40)p(-29,-33,-37)p(-25,-37,-35)glassp(-35,-26,-75)p(-35,-26,-40)p(-29,-33,-37)p(-25,-37,-35)c(0,0,255)p(-35,-24,45)p(-28,-33,35)p(-25,-40,20)p(-24,-41,5)p(-24,-40,0)p(-24,-40,5)p(-25,-39,-19)p(-25,-37,-35)p(-35,-26,-75)p(-32,-26,-80)p(-22,-39,-35)p(-22,-41,-29)p(-21,-42,5)p(-21,-42,0)p(-21,-43,5)p(-22,-42,20)p(-25,-35,35)p(-32,-24,50)c(0,0,255)p(-35,-26,-130)p(-32,-26,-80)p(-35,-26,-75)p(-35,-26,-40)p(-46,-23,-40)p(-46,-30,-130)c(0,0,255)p(-52,-27,-130)p(-55,-27,-115)p(-50,-20,-40)p(-46,-23,-40)p(-46,-25,-40)p(-46,-30,-130)c(0,0,255)p(-50,-20,50)p(-50,-20,60)p(-50,-23,75)p(-50,-22,85)p(-50,-20,92)p(-50,-15,100)p(-50,-10,102).p(-45,-10,112)p(-44,-10,120)p(-34,-10,130)p(-40,-20,110)p(-22,-20,110)p(-35,-28,85)p(-35,-28,75)p(-35,-25,60)p(-35,-25,52)p(-46,-23,52)c(2147483647,2147483647,2147483647)lightFgr(-40)p(-20,-8,133)p(-34,-10,130)p(-40,-20,110)p(-22,-20,110)c(0,0,255)p(-50,10,100)p(-48,9,110)p(-47,-3,110)p(-50,-4,102)c(0,0,255)p(-45,9,118)p(-48,9,110)p(-47,-3,110)p(-43,-2,118)c(0,0,255)p(-45,9,118)p(-36,9,125)p(-39,0,125)p(-43,-2,118)c(0,0,255)p(-36,9,125)p(-35,8,130)p(-39,0,130)p(-39,0,125)c(10,10,10)p(-18,0,145)p(-25,7,140)p(-35,8,130)p(-39,0,130).c(25,25,25)p(-45,-4,-50)p(-45,10,-50)p(-55,10,-50)p(-55,-4,-50).c(0,0,255)p(-55,-4,-60)p(-55,10,-60)p(-55,10,-50)p(-55,-4,-50)c(25,25,25)p(-45,-4,-60)p(-45,10,-60)p(-55,10,-60)p(-55,-4,-60)//c(50,50,50)p(20,-15,-130)p(26,5,-133)p(40,5,-130)p(46,0,-130)p(50,-15,-130)c(50,50,50)p(-20,-15,-130)p(-26,5,-133)p(-40,5,-130)p(-46,0,-130)p(-50,-15,-130)c(2147483647,0,0)lightBp(28,-22,-134)p(30,-24,-134)p(32,-24,-134)p(34,-22,-134)p(34,-20,-135)p(32,-18,-135)p(30,-18,-135)p(28,-20,-135)c(2147483647,0,0)lightBp(38,-22,-134)p(40,-24,-134)p(42,-24,-134)p(44,-22,-134)p(44,-20,-135)p(42,-18,-135)p(40,-18,-135)p(38,-20,-135)c(2147483647,0,0)lightBp(-28,-22,-134)p(-30,-24,-134)p(-32,-24,-134)p(-34,-22,-134)p(-34,-20,-135)p(-32,-18,-135)p(-30,-18,-135)p(-28,-20,-135)c(2147483647,0,0)lightBp(-38,-22,-134)p(-40,-24,-134)p(-42,-24,-134)p(-44,-22,-134)p(-44,-20,-135)p(-42,-18,-135)p(-40,-18,-135)p(-38,-20,-135)c(0,0,0)p(8,-2,-135)p(10,-4,-135)p(12,-4,-135)p(14,-2,-135)p(14,0,-136)p(12,2,-136)p(10,2,-136)p(8,0,-136)c(0,0,0)p(16,-2,-135)p(18,-4,-135)p(20,-4,-135)p(22,-2,-135)p(22,0,-136)p(20,2,-136)p(18,2,-136)p(16,0,-136)c(0,0,0)p(-8,-2,-135)p(-10,-4,-135)p(-12,-4,-135)p(-14,-2,-135)p(-14,0,-136)p(-12,2,-136)p(-10,2,-136)p(-8,0,-136)c(0,0,0)p(-16,-2,-135)p(-18,-4,-135)p(-20,-4,-135)p(-22,-2,-135)p(-22,0,-136)p(-20,2,-136)p(-18,2,-136)p(-16,0,-136)//w(cx,cy,cz,rotates,w,h)gwgr(40)rims(255,255,255,25,20)w(-40,-3,80,11,35,16)w(40,-3,80,11,-35,16)gwgr(40)rims(255,255,255,25,20)w(-40,-3,-80,0,35,16)w(40,-3,-80,0,-35,16)stat(177,177,119,136,71)physics(68,28,70,28,50,74,22,74,22,100,100,60,50,50,1,8691)
50 p / £3 = 50 p / 300 p = 1/6
p2-5p-50= (p-10) (p+5)
Let P = the rate P of 50 = 1/2P * 50 = 0.5divide both equation by 50, we get:P = 0.5/50P = 0.01P= 0.01 * 100%P = 1%Answer: 1% of 50 = 1/2.
First find the percentage of a number:a/b = p/100, *P is the percentageHere is a sample problem:What is %40 of 50?You would write that as:a/50 = 40/100Simplify (When possible)a/50 = 2/5Convert:How many times does it take 5 to go into 50?a/50 = 2x10/5x10Answer: 10a/50 = 20/50Divide (by 50)a = 2020 is %40 of 50Then find increase or decrease:Sample problem: 100 to 50 (decrease) *remember: a/b = p/100We are trying to find p so the equation is:50/100 = p/100Multiply by 100 to get p by itself50 = pAnswer: The percentage of decrease is 50 percentSample problem: 256 to 224 (decrease) *remember: a/b = p/100We are trying to find p so the equation is:224/256 = p/100Simplify (When possible).875 = p/100Multiply by 100 to get p by itself87.5 = pAnswer: The percentage of decrease is 87.5 percent
Master P is richer. Rapper, 50 Cent, has an estimated net worth of $140 million. Master P has a net worth of $350 million.
l'l[p]p[][p]p[]po]
p=a+b+c for a
Assuming each toss is independent, you can use the binomial distribution,P( X = 32) = 50C32*(p)32*(1-p)50-32 where p is the probablity of getting heads on a single toss. Assuming that the coin is fair, p = 1/2.So the answer is 50C32*(1/2)50 = 50!/(32!*18!*250 = 0.016 approx.Assuming each toss is independent, you can use the binomial distribution,P( X = 32) = 50C32*(p)32*(1-p)50-32 where p is the probablity of getting heads on a single toss. Assuming that the coin is fair, p = 1/2.So the answer is 50C32*(1/2)50 = 50!/(32!*18!*250 = 0.016 approx.Assuming each toss is independent, you can use the binomial distribution,P( X = 32) = 50C32*(p)32*(1-p)50-32 where p is the probablity of getting heads on a single toss. Assuming that the coin is fair, p = 1/2.So the answer is 50C32*(1/2)50 = 50!/(32!*18!*250 = 0.016 approx.Assuming each toss is independent, you can use the binomial distribution,P( X = 32) = 50C32*(p)32*(1-p)50-32 where p is the probablity of getting heads on a single toss. Assuming that the coin is fair, p = 1/2.So the answer is 50C32*(1/2)50 = 50!/(32!*18!*250 = 0.016 approx.
50 pennies in a half- dollar :)