05 ਨਿਰੰਤਰਤਾ ਅਤੇ ਵਿਭਿੰਨਤਾ
ਅਭਿਆਸ 02
Question:
Differentiate the function with respect to xcosx^3.sin^2(x^5)
Answer:
Answer:
Step 1: Differentiate the function with respect to x:
f’(x) = cosx^3.sin^2(x^5)
Step 2: Differentiate the function with respect to cosx^3:
f’(cosx^3) = sin^2(x^5)
Step 3: Differentiate the function with respect to sin^2(x^5):
f’(sin^2(x^5)) = 2sin(x^5)cos(x^5)
Question:
Differentiate the function with respect to x 2√cot(x^2)
Answer:
Step 1: Take the derivative of the inside function, cot(x^2), with respect to x.
Step 2: Apply the chain rule to the outside function, 2√, with respect to x.
Step 3: Multiply the derivatives of the inside and outside functions together.
Answer: -4x√cot(x^2) csc^2(x^2)
Question:
Differentiate the function with respect to x sec(tan(√x))
Answer:
Step 1: Rewrite the function as sec(arctan(√x))
Step 2: Use the Chain Rule and differentiate with respect to x:
d/dx sec(arctan(√x)) = sec(arctan(√x))sec2(arctan(√x))(1/2)*(1/x^(1/2))
Step 3: Simplify the expression:
d/dx sec(arctan(√x)) = (1/2)*sec(arctan(√x))*sec2(arctan(√x))*x^(-1/2)
Question:
Differentiate the function with respect to x sin(ax+b)
Answer:
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Differentiate the function: d/dx[sin(ax+b)]
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Use the chain rule: d/dx[sin(ax+b)] = d/du[sin(u)] * d/dx[ax+b]
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d/du[sin(u)] = cos(u)
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d/dx[ax+b] = a
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Substitute: d/dx[sin(ax+b)] = a*cos(ax+b)
Question:
Differentiate the function with respect to x cos(√x)
Answer:
Given, f(x) = cos(√x)
Step 1: Take the derivative of f(x) with respect to x.
f’(x) = -sin(√x) × (1/2√x)
Step 2: Substitute the value of f’(x) in the given equation.
Differentiate the function with respect to x cos(√x) = -sin(√x) × (1/2√x)
Question:
Differentiate the function with respect to x sin(ax+b)/cos(cx+d)
Answer:
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(a*cos(ax+b)*cos(cx+d)-sin(ax+b)csin(cx+d))/(cos(cx+d))^2
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(a*cos(ax+b)*cos(cx+d)-sin(ax+b)csin(cx+d))/(cos(cx+d))^2 * (dcos(cx+d)-csin(cx+d))
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(a*cos(ax+b)*dcos(cx+d)-sin(ax+b)ccos(cx+d)-asin(ax+b)csin(cx+d)+csin(ax+b)*sin(cx+d))/(cos(cx+d))^3
Question:
Differentiate the function with respect to x sin(x^2+5)
Answer:
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Differentiate the inside of the function with respect to x: (2x)
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Multiply the result by the outside of the function: (2x)sin(x^2+5)
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Simplify: 2xcos(x^2+5)
Question:
Differentiate the function with respect to x cos(sinx)
Answer:
Step 1: Take the derivative of cos(sinx) with respect to x.
Step 2: Use the Chain Rule:
d/dx[cos(sinx)] = -sin(sinx) * d/dx[sinx]
Step 3: Take the derivative of sinx with respect to x.
d/dx[sinx] = cosx
ਜੇਈਈ ਅਧਿਐਨ ਸਮੱਗਰੀ (ਗਣਿਤ)
01 ਸਬੰਧ ਅਤੇ ਕਾਰਜ
02 ਉਲਟ ਤਿਕੋਣਮਿਤੀ ਫੰਕਸ਼ਨ
03 ਮੈਟ੍ਰਿਕਸ
04 ਨਿਰਧਾਰਕ
05 ਨਿਰੰਤਰਤਾ ਅਤੇ ਵਿਭਿੰਨਤਾ
06 ਡੈਰੀਵੇਟਿਵਜ਼ ਦੀ ਐਪਲੀਕੇਸ਼ਨ
07 ਅਟੁੱਟ
08 ਇੰਟੀਗ੍ਰੇਲਸ ਦੀ ਐਪਲੀਕੇਸ਼ਨ
09 ਵੈਕਟਰ
10 ਤਿੰਨ ਅਯਾਮੀ ਜਿਓਮੈਟਰੀ
11 ਲੀਨੀਅਰ ਪ੍ਰੋਗਰਾਮਿੰਗ
12 ਸੰਭਾਵਨਾ