Math, asked by Anonymous, 5 months ago

2. In Fig. 8.13, find tan P – cot R

Answers

Answered by Anonymous
20

In the given triangle PQR, the given triangle is right angled at Q and the given measures are:

PR = 13cm,

PQ = 12cm

Since the given triangle is right angled triangle, to find the side QR, apply the Pythagorean theorem

According to Pythagorean theorem,

In a right- angled triangle, the squares of the hypotenuse side is equal to the sum of the squares of the other two sides.

PR2 = QR2 + PQ2

Substitute the values of PR and PQ

132 = QR2+122

169 = QR2+144

Therefore, QR2 = 169−144

QR2 = 25

QR = √25 = 5

Therefore, the side QR = 5 cm

To find tan P – cot R:

According to the trigonometric ratio, the tangent function is equal to the ratio of the length of the opposite side to the adjacent sides, the value of tan (P) becomes

tan (P) = Opposite side /Adjacent side = QR/PQ = 5/12

Since cot function is the reciprocal of the tan function, the ratio of cot function becomes,

Cot (R) = Adjacent side/Opposite side = QR/PQ = 5/12

Therefore,

tan (P) – cot (R) = 5/12 – 5/12 = 0

Therefore, tan(P) – cot(R) = 0

Attachments:
Answered by skpillai636
3

Answer:

Step-by-step explanation:

In △PQR

PR2=PQ2+QR2       ....(Pythagoras theorem)

132=122+QR2

QR2=169−144

​=25

​=5 cm

tanP=QR/​PQ=5/12​,cotR=QR​/PQ=5/12​

∴tanP−cotR=5/12​−5/12​=0

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