265*2/5 = (265/5)*2 = 53*2 = 106
2 kg 265 g = 4.993 pounds.
2.732
Let x and y be the unknowns. Based on the given problem, we have: x + y = -19 [The sum of two numbers is -19] xy = 24 [The product of two numbers is 24] Solve for these numbers either by elimination or substitution method. The recommended choice is substitution method. Solve for y for the second equation: y = 24/x Substitute that expression for the first equation: x + (24/x) = -19 Solve for x by rearranging the terms: x² + 24 = -19x [Multiply both sides by x] x² + 19x + 24 = 0 Since the expression can't be factored, you don't get integers for x and y. Let's complete the square, and see what we have: x² + 19x + (19/2)² = -24 + (19/2)² (x + (19/2))² = 66.25 x + (19/2) = ±√(66.25) or ±√(265/4) x + (19/2) = ±√(265)/2 x = (-19 ± √(265))/2 Finally, substitute that value back for either of the equation and solve for y. You should get: y = ±24/((-19 ± √(265))/2) = ½(-19 ∓ √265) So the numbers are: x = ½ * (-19 - √265) and y = ½ * (√265 - 19) y = ½ * (√(265) - 19) and y = ½ * (-19 - √265)
265%
x2 + 5x = 60 x2 + 5x + 25/4 = 60 + 25 / 4 (x + 5/2)2 = 265/4 x + 5/2 = (265/4)1/2 x = -5/2 ± √265 / 2 x = -(5 ± √265) / 2
265*2/5 = (265/5)*2 = 53*2 = 106
To write 265 in expanded form, you would break it down into its constituent parts based on its place value. In this case, 265 is composed of 200 (2 hundreds), 60 (6 tens), and 5 (5 ones). Therefore, the expanded form of 265 is 200 + 60 + 5.
As of 07/2008, $265 to $300.
The 2 in 265 is worth 200. The 2 in 324 is worth 20. Add them together and you get 220,
2 kg 265 g = 4.993 pounds.
$25000
2 13/20
$25000
2.732
Yes, 530 / 2 = 265
Let x and y be the unknowns. Based on the given problem, we have: x + y = -19 [The sum of two numbers is -19] xy = 24 [The product of two numbers is 24] Solve for these numbers either by elimination or substitution method. The recommended choice is substitution method. Solve for y for the second equation: y = 24/x Substitute that expression for the first equation: x + (24/x) = -19 Solve for x by rearranging the terms: x² + 24 = -19x [Multiply both sides by x] x² + 19x + 24 = 0 Since the expression can't be factored, you don't get integers for x and y. Let's complete the square, and see what we have: x² + 19x + (19/2)² = -24 + (19/2)² (x + (19/2))² = 66.25 x + (19/2) = ±√(66.25) or ±√(265/4) x + (19/2) = ±√(265)/2 x = (-19 ± √(265))/2 Finally, substitute that value back for either of the equation and solve for y. You should get: y = ±24/((-19 ± √(265))/2) = ½(-19 ∓ √265) So the numbers are: x = ½ * (-19 - √265) and y = ½ * (√265 - 19) y = ½ * (√(265) - 19) and y = ½ * (-19 - √265)