257,842 views
35 votes
35 votes
Please help its confusing meeeeee

Please help its confusing meeeeee-example-1
User Johira Afzali
by
2.5k points

2 Answers

13 votes
13 votes

Answer:

p = 21.4 cm

∠P = 44°

Explanation:

Apply the Pythagorean Theorem to solve for the length of p.

  • p² + 21² = 30²
  • p² = 900 - 441
  • p² = 459
  • p = √459

  • \fbox {p = 21.4 cm}

Now, take the inverse sine function to find angle P :

  • sin⁻¹ (opposite side / hypotenuse)
  • sin⁻¹ (21/30)
  • sin⁻¹ (0.7)

  • \boxed {44^(o)} (approximately)
User Darm
by
3.1k points
19 votes
19 votes

Answer:

a) 21.4 cm

b) 45.6°

Explanation:

The mnemonic SOH CAH TOA is intended to remind you of the relationships between trig functions and sides of a right triangle. Here, two relevant function are ...

Cos = Adjacent/Hypotenuse

Tan = Opposite/Adjacent

b) Angle P

The hypotenuse of the triangle, and the side adjacent to angle P are given, so we have ...

cos(P) = (21 cm)/(30 cm)

The angle value can be found using the inverse cosine function:

P = arccos(21/30)

P ≈ 45.6°

a) Side p

Now, we know angle P and the side adjacent to it. We want to find the measure of side p, which is opposite the angle. This can be done using either the sine function or the tangent function. Here, we choose to use the tangent function.

tan(P) = p/21

p = 21×tan(P) = 21·tan(45.573°)

p ≈ 21.4 . . . . cm

__

Additional comment

In the attached, part of the calculator keypad is shown so you can see that the inverse cosine function is the 2ND function of the Cos key. The calculator mode is set to DEG (lower left of display) so that angles are in units appropriate to this problem.

Of course, you can always use the Pythagorean theorem to find the length of side p. More calculations are involved, so we used trig functions instead. Note that the angle P must be found first using the approach here, and its value must be retained with enough significant digits to ensure accuracy in the 'p' calculation.

Please help its confusing meeeeee-example-1
User Mahendra Chhimwal
by
2.7k points