Question

# (Area of GPL) to (Area of ALD) is equal to

## The correct answer is:

### Related Questions to study

### A small source of sound moves on a circle as shown in the figure and an observer is standing on Let and be the frequencies heard when the source is at and respectively. Then

### A small source of sound moves on a circle as shown in the figure and an observer is standing on Let and be the frequencies heard when the source is at and respectively. Then

### In a triangle ABC, if a : b : c = 7 : 8 : 9, then cos A : cos B equals to

### In a triangle ABC, if a : b : c = 7 : 8 : 9, then cos A : cos B equals to

### Which of the following curves represents correctly the oscillation given by

### Which of the following curves represents correctly the oscillation given by

### A is a set containing n elements. A subset P_{1} is chosen, and A is reconstructed by replacing the elements of P_{1}. The same process is repeated for subsets P_{1}, P_{2}, … , P_{m}, with m > 1. The Number of ways of choosing P_{1}, P_{2}, …, P_{m} so that P_{1} P_{2} … P_{m}= A is -

### A is a set containing n elements. A subset P_{1} is chosen, and A is reconstructed by replacing the elements of P_{1}. The same process is repeated for subsets P_{1}, P_{2}, … , P_{m}, with m > 1. The Number of ways of choosing P_{1}, P_{2}, …, P_{m} so that P_{1} P_{2} … P_{m}= A is -

### The number of points in the Cartesian plane with integral co-ordinates satisfying the inequalities |x| k, |y| k, |x – y| k ; is-

### The number of points in the Cartesian plane with integral co-ordinates satisfying the inequalities |x| k, |y| k, |x – y| k ; is-

### The angle between the lines and is

Here we used the concept of cartesian lines and some trigonometric terms to solve. With the help of slope we identified the angle between them. Hence, these lines are perpendicular so the angle between them is $90 degrees.$

### The angle between the lines and is

Here we used the concept of cartesian lines and some trigonometric terms to solve. With the help of slope we identified the angle between them. Hence, these lines are perpendicular so the angle between them is $90 degrees.$

### The polar equation of the straight line passing through and perpendicular to the initial line is

### The polar equation of the straight line passing through and perpendicular to the initial line is

### The polar equation of the straight line passing through and parallel to the initial line is

### The polar equation of the straight line passing through and parallel to the initial line is

### The equation of the line passing through pole and is

### The equation of the line passing through pole and is

### The polar equation of is

Here we used the concept of polar coordinate system and also the trigonometric ratios to find the solution. So the equation is .

### The polar equation of is

Here we used the concept of polar coordinate system and also the trigonometric ratios to find the solution. So the equation is .

### The cartesian equation of is

Here we used the concept of the polar coordinate system and also the trigonometric ratios to find the solution. So the equation is .

### The cartesian equation of is

Here we used the concept of the polar coordinate system and also the trigonometric ratios to find the solution. So the equation is .

### Two tuning forks and are vibrated together. The number of beats produced are represented by the straight line in the following graph. After loading with wax again these are vibrated together and the beats produced are represented by the line If the frequency of is the frequency of will be

### Two tuning forks and are vibrated together. The number of beats produced are represented by the straight line in the following graph. After loading with wax again these are vibrated together and the beats produced are represented by the line If the frequency of is the frequency of will be

### If a hyperbola passing through the origin has and as its asymptotes, then the equation of its tranvsverse and conjugate axes are

Here we used the concept of polar coordinate system and also the trigonometric ratios to find the solution.

### If a hyperbola passing through the origin has and as its asymptotes, then the equation of its tranvsverse and conjugate axes are

Here we used the concept of polar coordinate system and also the trigonometric ratios to find the solution.