Answer to Question #325660 in Algebra for Azuazu Roy

1_____________________________________

What he saved first called first a=100

Common different d=20

Sum of the last term S_n=5800

Using the formular "S_n=\\frac{n}{2}(2a+(n-1)d)"

"5800 = \\frac{n}{2}(2\u00d7100+(n-1)20)"

"5800 = \\frac{n}{2}(200+20n-20)\\\\\n5800 = \\frac{n}{2}(180+20n)\\\\\n5800 = \\frac{20\u00d7n}{2}(9+n)\\\\\n580 = n(9+n)\\\\\nn^2 +9n-580 = 0"

In the quadratic equation ax² + bx + c = 0

a = 1; b = 9; c = -580

"D = b^2 -4ac \\\\\nx = \\frac{-b\u00b1\\sqrt{D}}{2a}\\\\\nD = 9^2 - 4\u00d71\u00d7(-580) = 81 + 2320 =2401\\\\\n\\sqrt{D} = \\sqrt{2401} = 49\\\\\nx_1 = \\frac{-9-49}{2\u00d71} = -29\\\\\nx_2 = \\frac{-9+49}{2\u00d71} = 20"

n₁ = -29 (incorrect)

n₂ = 20

Answer: 20 years

______________________________________

2_____________________________________

Polygon has 25 terms which are in AP

Given,

Perimeter of polygon = 2100

Means sum of all terms AP = 2100

Hence,

If t₁, t_n are first and last term AP

Then, given

"t_n = 20t_1\\\\\n\n 2100 = 25\/2(t_1 + t_n)\\\\\n\n2100 = 25\/2(t_1 + 20t_1)\\\\\n\n2100 = 25\/2\u00d7(21t_1)\\\\\n\n100 = 25t_1\/2\\\\\n\nt_1= 200\/25 = 8\\\\\n\n\n\nt_{25} = 8 + (25-1)d\\\\\n\n20*8 = 8 + 24d\\\\\n\n24d = 152\\\\\n\nd = 19\/3\\\\"

Answer:

the smallest side = 8

the common difference = 19/3

______________________________________