03 ਤ੍ਰਿਕੋਣਮਿਤੀਕ ਫੰਕਸ਼ਨ
ਅਭਿਆਸ 04
Question:
If sinx+sin3x+sin5x=0, then the solution is A x=2nπ/3,nϵI B nπ/3,nϵI C (3n±1)π/3,nϵI D none of these
Answer:
Answer: C (3n±1)π/3,nϵI
Question:
Solve: tanx=−√3
Answer:
Step 1: Solve for x in terms of the inverse tangent: x = tan-1(-√3).
Step 2: Use a calculator to calculate the value of x, which is approximately -54.735610317245 degrees.
Question:
Principle solution of equation cotx=−√3 is A π/3 B 2π/3 C π/6 D 5π/6
Answer:
Step 1: Write the equation in terms of sine and cosine.
cotx = -√3
=> sinx/cosx = -√3
Step 2: Solve for sinx.
sinx = -√3cosx
Step 3: Use the fact that sin2x + cos2x = 1 to solve for cosx.
cos2x = 1 + (√3)2cos2x
=> cos2x = 1 - 3cos2x
=> 4cos2x = 1
=> cos2x = 1/4
Step 4: Solve for x.
cosx = ±1/2
=> x = ±π/3 or ±2π/3
Therefore, the principle solution of the equation cotx=-√3 is A π/3.
Question:
Solve the following equation: cosx+cos3x−cos2x=0
Answer:
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Cosx + Cos3x - Cos2x = 0
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Cosx + Cos(2x + x) - Cos2x = 0
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Cosx + Cos2x*Cosx - Cos2x = 0
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Cosx(1 + Cos2x) - Cos2x = 0
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Cos2x(Cosx - 1) = 0
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Cosx = 1 or Cos2x = 0
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x = 0 or x = ±π/2
Question:
Find the general solution: cos3x+cosx−cos2x=0
Answer:
Step 1: Use the identity cos(A + B) = cosAcosB - sinAsinB to rewrite the equation as cos3x + cosx - (2cos2x - 1) = 0
Step 2: Use the identity cos2A = 2cos2A-1 to rewrite the equation as cos3x + cosx - 2cos2x + 1 = 0
Step 3: Factor out the common factor of cosx to get cosx(cos2x + 1) = 0
Step 4: Set each factor equal to zero and solve for x: cosx = 0 ⇒ x = (2n + 1)π/2 cos2x + 1 = 0 ⇒ 2cos2x - 1 = 0 ⇒ cosx = ±1/√2 ⇒ x = (2n + 1)π/3, (2n + 1)5π/6
Question:
Find the general solution: cos4x=cos2x
Answer:
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Rewrite the equation as cos4x=1-2sin2x.
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Replace cos4x with (cos2x)2.
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Factor the equation to get (cos2x-1)(cos2x+1)=2sin2x.
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Solve for cos2x by dividing each side by (cos2x+1): cos2x=1-2sin2x/(cos2x+1).
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Solve for sin2x by using the Pythagorean identity: sin2x=sqrt(1-(1-2sin2x/(cos2x+1))2).
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The general solution is cos2x=1-2sin2x/(cos2x+1) and sin2x=sqrt(1-(1-2sin2x/(cos2x+1))2).
Question:
Find the general solution of the equation sin2x+cosx=0.
Answer:
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Start by expanding the left side of the equation: sin2x+cosx=2sinxcosx+cosx
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Set the left side of the equation equal to zero: 2sinxcosx+cosx=0
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Factor the left side of the equation: (2sinx+1)(cosx)=0
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Set each factor equal to zero: 2sinx+1=0 and cosx=0
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Solve for each factor: 2sinx=-1 and cosx=0
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Find the solution for each equation: x= -π/4 and x=π/2
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The general solution of the equation sin2x+cosx=0 is x=-π/4 and x=π/2.
Question:
Find the general solution of cosec x = -2.
Answer:
Step 1: cosec x = -2
Step 2: 1/sin x = -2
Step 3: sin x = -1/2
Step 4: x = arcsin(-1/2) + 2πn, where n is an integer.
Step 5: The general solution is x = arcsin(-1/2) + 2πn, where n is an integer.
Question:
Find the general solution of the equation sec22x=1−tan2x.
Answer:
- sec2 2x = 1 - tan2x
- sec2 2x = sec2x - tan2x
- sec2 2x - sec2x = -tan2x
- (sec2x)(sec2x - 1) = -tan2x
- sec2x = -tan2x/(sec2x - 1)
- 2x = arctan(-tan2x/(sec2x - 1)) + nπ for any integer n
ਜੇਈਈ ਅਧਿਐਨ ਸਮੱਗਰੀ (ਗਣਿਤ)
01 ਸੈੱਟ
02 ਸਬੰਧ ਅਤੇ ਕਾਰਜ
03 ਤ੍ਰਿਕੋਣਮਿਤੀਕ ਫੰਕਸ਼ਨ
04 ਗਣਿਤਿਕ ਇੰਡਕਸ਼ਨ ਦਾ ਸਿਧਾਂਤ
05 ਕੰਪਲੈਕਸ ਨੰਬਰ ਅਤੇ ਕੁਆਡ੍ਰੈਟਿਕ ਸਮੀਕਰਨ
06 ਰੇਖਿਕ ਅਸਮਾਨਤਾਵਾਂ
07 ਪਰਮਿਊਟੇਸ਼ਨ ਅਤੇ ਕੰਬੀਨੇਸ਼ਨ
08 ਬਾਇਨੋਮਿਅਲ ਥਿਊਰਮ
09 ਕ੍ਰਮ ਅਤੇ ਲੜੀ
10 ਸਿੱਧੀਆਂ ਲਾਈਨਾਂ ਦੀ ਕਸਰਤ
10 ਸਿੱਧੀਆਂ ਰੇਖਾਵਾਂ ਫੁਟਕਲ
11 ਕੋਨਿਕ ਸੈਕਸ਼ਨ
12 ਤਿੰਨ ਅਯਾਮੀ ਜਿਓਮੈਟਰੀ ਦੀ ਜਾਣ-ਪਛਾਣ
13 ਸੀਮਾਵਾਂ ਅਤੇ ਡੈਰੀਵੇਟਿਵਜ਼
14 ਗਣਿਤਿਕ ਤਰਕ
15 ਅੰਕੜੇ
16 ਸੰਭਾਵਨਾ