English

Science (English Medium) Class 12 - CBSE Question Bank Solutions

Advertisements
Subjects
Topics
Subjects
Popular subjects
Topics

Please select a subject first

Advertisements
Advertisements
< prev  10101 to 10120 of 19237  next > 

Show that f(x) = loga x, 0 < a < 1 is a decreasing function for all x > 0 ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Find the angle between the pairs of lines with direction ratios proportional to 5, −12, 13 and −3, 4, 5

[11] Three - Dimensional Geometry
Chapter: [11] Three - Dimensional Geometry
Concept: undefined >> undefined

Advertisements

Show that f(x) = sin x is increasing on (0, π/2) and decreasing on (π/2, π) and neither increasing nor decreasing in (0, π) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = log sin x is increasing on (0, π/2) and decreasing on (π/2, π) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Find the angle between the pairs of lines with direction ratios proportional to  2, 2, 1 and 4, 1, 8 .

 

[11] Three - Dimensional Geometry
Chapter: [11] Three - Dimensional Geometry
Concept: undefined >> undefined

Show that f(x) = x − sin x is increasing for all x ∈ R ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = x3 − 15x2 + 75x − 50 is an increasing function for all x ∈ R ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Find the angle between the pairs of lines with direction ratios proportional to  1, 2, −2 and −2, 2, 1 .

[11] Three - Dimensional Geometry
Chapter: [11] Three - Dimensional Geometry
Concept: undefined >> undefined

Show that f(x) = cos2 x is a decreasing function on (0, π/2) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = sin x is an increasing function on (−π/2, π/2) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Find the angle between the pairs of lines with direction ratios proportional to   abc and b − cc − aa − b.

[11] Three - Dimensional Geometry
Chapter: [11] Three - Dimensional Geometry
Concept: undefined >> undefined

Show that f(x) = cos x is a decreasing function on (0, π), increasing in (−π, 0) and neither increasing nor decreasing in (−π, π) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Find the angle between two lines, one of which has direction ratios 2, 2, 1 while the  other one is obtained by joining the points (3, 1, 4) and (7, 2, 12). 

[11] Three - Dimensional Geometry
Chapter: [11] Three - Dimensional Geometry
Concept: undefined >> undefined

Show that f(x) = tan x is an increasing function on (−π/2, π/2) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = tan−1 (sin x + cos x) is a decreasing function on the interval (π/4, π/2) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that the function f(x) = sin (2x + π/4) is decreasing on (3π/8, 5π/8) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that the function f(x) = cot \[-\] l(sinx + cosx) is decreasing on \[\left( 0, \frac{\pi}{4} \right)\] and increasing on \[\left( 0, \frac{\pi}{4} \right)\] ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = (x − 1) ex + 1 is an increasing function for all x > 0 ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that the function x2 − x + 1 is neither increasing nor decreasing on (0, 1) ?

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = x9 + 4x7 + 11 is an increasing function for all x ∈ R ? 

[6] Applications of Derivatives
Chapter: [6] Applications of Derivatives
Concept: undefined >> undefined
< prev  10101 to 10120 of 19237  next > 
Advertisements
Advertisements
CBSE Science (English Medium) Class 12 Question Bank Solutions
Question Bank Solutions for CBSE Science (English Medium) Class 12 Biology
Question Bank Solutions for CBSE Science (English Medium) Class 12 Chemistry
Question Bank Solutions for CBSE Science (English Medium) Class 12 Computer Science (C++)
Question Bank Solutions for CBSE Science (English Medium) Class 12 Computer Science (Python)
Question Bank Solutions for CBSE Science (English Medium) Class 12 English Core
Question Bank Solutions for CBSE Science (English Medium) Class 12 English Elective - NCERT
Question Bank Solutions for CBSE Science (English Medium) Class 12 Entrepreneurship
Question Bank Solutions for CBSE Science (English Medium) Class 12 Geography
Question Bank Solutions for CBSE Science (English Medium) Class 12 Hindi (Core)
Question Bank Solutions for CBSE Science (English Medium) Class 12 Hindi (Elective)
Question Bank Solutions for CBSE Science (English Medium) Class 12 History
Question Bank Solutions for CBSE Science (English Medium) Class 12 Informatics Practices
Question Bank Solutions for CBSE Science (English Medium) Class 12 Mathematics
Question Bank Solutions for CBSE Science (English Medium) Class 12 Physical Education
Question Bank Solutions for CBSE Science (English Medium) Class 12 Physics
Question Bank Solutions for CBSE Science (English Medium) Class 12 Political Science
Question Bank Solutions for CBSE Science (English Medium) Class 12 Psychology
Question Bank Solutions for CBSE Science (English Medium) Class 12 Sanskrit (Core)
Question Bank Solutions for CBSE Science (English Medium) Class 12 Sanskrit (Elective)
Question Bank Solutions for CBSE Science (English Medium) Class 12 Sociology
Share
Notifications

Englishहिंदीमराठी


      Forgot password?
Use app×