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Composition of Functions MCQ Quiz in मराठी - Objective Question with Answer for Composition of Functions - मोफत PDF डाउनलोड करा

Last updated on Mar 25, 2025

पाईये Composition of Functions उत्तरे आणि तपशीलवार उपायांसह एकाधिक निवड प्रश्न (MCQ क्विझ). हे मोफत डाउनलोड करा Composition of Functions एमसीक्यू क्विझ पीडीएफ आणि बँकिंग, एसएससी, रेल्वे, यूपीएससी, स्टेट पीएससी यासारख्या तुमच्या आगामी परीक्षांची तयारी करा.

Latest Composition of Functions MCQ Objective Questions

Composition of Functions Question 1:

पुढील बाबींसाठी खालील बाबीचा विचार करा:

समजा f(x) आणि g(x) ही दोन फंक्शन्स आहेत, जसे की $g (x) = x - \frac{1}{x}$ आणि $f o g (x) = x^{3} - \frac{1}{x^{3}}$ . तर g[f(x) - 3x] बरोबर किती?

$x^{3} - \frac{1}{x^{3}}$
$x^{3} + \frac{1}{x^{3}}$
$x^{2} - \frac{1}{x^{2}}$
$x^{2} + \frac{1}{x^{2}}$

Answer (Detailed Solution Below)

Option 1 :

x^{3} - \frac{1}{x^{3}}

दिलेले आहे -

$g (x) = x - \frac{1}{x}$ आणि $f o g (x) = x^{3} - \frac{1}{x^{3}}$

संकल्पना -

$x^{3} - \frac{1}{x^{3}} = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

स्पष्टीकरण -

आपल्याकडे, $f o g (x) = x^{3} - \frac{1}{x^{3}}$

⇒ $f (g (x)) = x^{3} - \frac{1}{x^{3}}$

सूत्र वापरून, आपल्याकडे -

⇒ $f (g (x)) = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

आपल्याकडे, $g (x) = x - \frac{1}{x}$

⇒ $f (x - \frac{1}{x}) = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

x - 1/x = y ला बदलू, आपल्याकडे,

⇒ $f (y) = y^{3} + 3 y$

आता f(x) = x3 + 3x

तर f(x) - 3x = x3 + 3x - 3x = x3

आता g[f(x) - 3x] = g(x3) = $x^{3} - \frac{1}{x^{3}}$

म्हणून, पर्याय (1) योग्य आहे.

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Composition of Functions Question 2:

जर f(x) = 4x + 3, तर f o f o f(-1) कशाच्या समान आहे?

-1
0
1
2

Answer (Detailed Solution Below)

Option 1 : -1

संकल्पना:

f आणि g या कोणत्याही दोन फलांसाठी, f o g हे f[g(x)] म्हणून परिभाषित केले जाते.

गणना:

दिलेल्याप्रमाणे,

f(x) = 4x + 3

वरील संकल्पना वापरून

⇒ fof(x) = 4(4x + 3) + 3

⇒ fof(x) = 16x + 15

पुन्हा समान संकल्पना वापरून

⇒ fofof(x) = 16(4x + 3) + 15

⇒ fofof(x) = 64x + 63

वरील फलात x = -1 हे मूल्य टाकून,

⇒ fofof(-1) = 64(-1) + 63 = -1

∴ f o f o f(-1) हे -1 च्या समान आहे.

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Composition of Functions Question 3:

समजा f(x) = px + q आणि g(x) = mx + n आहे. तर f (g(x)) = g (f(x)) च्या समतुल्य काय आहे?

f(p) = g(m)
f(q) = g(n)
f(n) = g(q)
f(m) = g(p)

Answer (Detailed Solution Below)

Option 3 : f(n) = g(q)

गणना:

दिलेले आहे: f(x) = px + q आणि g(x) = mx + n

f (g(x)) = g (f(x))

⇒ f (mx + n) = g (px + q)

⇒ p (mx + n) + q = m (px + q) + n

⇒ pmx + pn + q = pmx + mq + n

⇒ pn + q = mq + n

⇒ f (n) = g (q)

∴ पर्याय 3 हे योग्य उत्तर आहे.

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Top Composition of Functions MCQ Objective Questions

Composition of Functions Question 4

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जर f(x) = 4x + 3, तर f o f o f(-1) कशाच्या समान आहे?

-1
0
1
2

Answer (Detailed Solution Below)

Option 1 : -1

संकल्पना:

f आणि g या कोणत्याही दोन फलांसाठी, f o g हे f[g(x)] म्हणून परिभाषित केले जाते.

गणना:

दिलेल्याप्रमाणे,

f(x) = 4x + 3

वरील संकल्पना वापरून

⇒ fof(x) = 4(4x + 3) + 3

⇒ fof(x) = 16x + 15

पुन्हा समान संकल्पना वापरून

⇒ fofof(x) = 16(4x + 3) + 15

⇒ fofof(x) = 64x + 63

वरील फलात x = -1 हे मूल्य टाकून,

⇒ fofof(-1) = 64(-1) + 63 = -1

∴ f o f o f(-1) हे -1 च्या समान आहे.

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Composition of Functions Question 5

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समजा f(x) = px + q आणि g(x) = mx + n आहे. तर f (g(x)) = g (f(x)) च्या समतुल्य काय आहे?

f(p) = g(m)
f(q) = g(n)
f(n) = g(q)
f(m) = g(p)

Answer (Detailed Solution Below)

Option 3 : f(n) = g(q)

गणना:

दिलेले आहे: f(x) = px + q आणि g(x) = mx + n

f (g(x)) = g (f(x))

⇒ f (mx + n) = g (px + q)

⇒ p (mx + n) + q = m (px + q) + n

⇒ pmx + pn + q = pmx + mq + n

⇒ pn + q = mq + n

⇒ f (n) = g (q)

∴ पर्याय 3 हे योग्य उत्तर आहे.

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Composition of Functions Question 6:

जर f(x) = 4x + 3, तर f o f o f(-1) कशाच्या समान आहे?

-1
0
1
2

Answer (Detailed Solution Below)

Option 1 : -1

संकल्पना:

f आणि g या कोणत्याही दोन फलांसाठी, f o g हे f[g(x)] म्हणून परिभाषित केले जाते.

गणना:

दिलेल्याप्रमाणे,

f(x) = 4x + 3

वरील संकल्पना वापरून

⇒ fof(x) = 4(4x + 3) + 3

⇒ fof(x) = 16x + 15

पुन्हा समान संकल्पना वापरून

⇒ fofof(x) = 16(4x + 3) + 15

⇒ fofof(x) = 64x + 63

वरील फलात x = -1 हे मूल्य टाकून,

⇒ fofof(-1) = 64(-1) + 63 = -1

∴ f o f o f(-1) हे -1 च्या समान आहे.

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Composition of Functions Question 7:

समजा f(x) = px + q आणि g(x) = mx + n आहे. तर f (g(x)) = g (f(x)) च्या समतुल्य काय आहे?

f(p) = g(m)
f(q) = g(n)
f(n) = g(q)
f(m) = g(p)

Answer (Detailed Solution Below)

Option 3 : f(n) = g(q)

गणना:

दिलेले आहे: f(x) = px + q आणि g(x) = mx + n

f (g(x)) = g (f(x))

⇒ f (mx + n) = g (px + q)

⇒ p (mx + n) + q = m (px + q) + n

⇒ pmx + pn + q = pmx + mq + n

⇒ pn + q = mq + n

⇒ f (n) = g (q)

∴ पर्याय 3 हे योग्य उत्तर आहे.

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Composition of Functions Question 8:

पुढील बाबींसाठी खालील बाबीचा विचार करा:

समजा f(x) आणि g(x) ही दोन फंक्शन्स आहेत, जसे की $g (x) = x - \frac{1}{x}$ आणि $f o g (x) = x^{3} - \frac{1}{x^{3}}$ . तर g[f(x) - 3x] बरोबर किती?

$x^{3} - \frac{1}{x^{3}}$
$x^{3} + \frac{1}{x^{3}}$
$x^{2} - \frac{1}{x^{2}}$
$x^{2} + \frac{1}{x^{2}}$

Answer (Detailed Solution Below)

Option 1 :

x^{3} - \frac{1}{x^{3}}

दिलेले आहे -

$g (x) = x - \frac{1}{x}$ आणि $f o g (x) = x^{3} - \frac{1}{x^{3}}$

संकल्पना -

$x^{3} - \frac{1}{x^{3}} = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

स्पष्टीकरण -

आपल्याकडे, $f o g (x) = x^{3} - \frac{1}{x^{3}}$

⇒ $f (g (x)) = x^{3} - \frac{1}{x^{3}}$

सूत्र वापरून, आपल्याकडे -

⇒ $f (g (x)) = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

आपल्याकडे, $g (x) = x - \frac{1}{x}$

⇒ $f (x - \frac{1}{x}) = (x - \frac{1}{x})^{3} + 3 (x - \frac{1}{x})$

x - 1/x = y ला बदलू, आपल्याकडे,

⇒ $f (y) = y^{3} + 3 y$

आता f(x) = x3 + 3x

तर f(x) - 3x = x3 + 3x - 3x = x3

आता g[f(x) - 3x] = g(x3) = $x^{3} - \frac{1}{x^{3}}$

म्हणून, पर्याय (1) योग्य आहे.

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