Math, asked by Anonymous, 7 months ago

Q:-TanA=1/3, find the other trigonometrical ratios
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Answers

Answered by Anonymous
3

Step-by-step explanation:

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Q:-TanA=1/3, find the other trigonometrical ratios

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Given :-

⟹TanA=  \frac{1}{3}

⟹CotA =  \frac{3}{1}  = 3

⟹Tan A=  \frac{1}{3}

 {Tan}^{2} A =  \frac{1}{9}

⟹1 +  {Tan}^{2} A = 1 +  \frac{1}{9}  =  \frac{9 + 1}{9}  =  \frac{10}{9}

⟹SecA =   \sqrt{ \frac{10}{9} }

⟹CosA =  \frac{3}{ \sqrt{10} }

⟹ {Cos}^{2} A=  \frac{9}{10}

⟹1 -  {Cos}^{2} A = 1 -  \frac{9}{10}

⟹ {Sin}^{2} A =  \frac{10 - 9}{10} =  \frac{1}{10}

⟹SinA =  \sqrt{ \frac{1}{10} }  =  \frac{1}{ \sqrt{10} }

⟹CosecA =  \sqrt{10}

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HOPE IT HELPS YOU..

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Thankyou:)

Answered by sk181231
0

Answer:

Given,

Area of rectangle = 25x2 – 35x + 12

We know, area of rectangle = length × breadth

So, by factoring 25x2 – 35x + 12, the length and breadth can be obtained.

25x2 – 35x + 12 = 25x2 – 15x – 20x + 12

=> 25x2 – 35x + 12 = 5x(5x – 3) – 4(5x – 3)

=> 25x2 – 35x + 12 = (5x – 3)(5x – 4)

So, the length and breadth are (5x – 3)(5x – 4).

Now, perimeter = 2(length + breadth)

So, perimeter of the rectangle = 2[(5x – 3)+(5x – 4)]

= 2(5x – 3 + 5x – 4) = 2(10x – 7) = 20x – 14

So, the perimeter = 20x – 14

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