Biology
General
Easy
Question
Identify the figure and choose the correct option stating its part A to F
![](data:image/png;base64,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)
- i) – Oesophagus, (ii)- Fundus, iii) – Body, iv) – Antrum, v) – Cardia, (vi) – Duodenum
- i) – Antrum, ii) – Body, iii) – Cardia, iv) – Duodenum, v) – Oesophagus, (vi) – Fundus
- i) – Cardia, ii) – Antrum, iii) – Pylorus, iv) – Body, v) – Fundus, (vi) – Oesophagus
- i) – Body, ii) – Fundus, iii) – Oesophagus, iv) – Pylorus, v) – Cardia, (vi) – antrum
The correct answer is: i) – Cardia, ii) – Antrum, iii) – Pylorus, iv) – Body, v) – Fundus, (vi) – Oesophagus
Related Questions to study
biology
Identify the figure given below and choose the correct option
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)
Identify the figure given below and choose the correct option
![](data:image/png;base64,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)
biologyGeneral
Maths-
If
are in A.P., then the value of n is
If
are in A.P., then the value of n is
Maths-General
maths-
maths-General
maths-
If
then![text end text stack l i m with x rightwards arrow 1 below f left parenthesis x right parenthesis equals](data:image/png;base64,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)
If
then![text end text stack l i m with x rightwards arrow 1 below f left parenthesis x right parenthesis equals](data:image/png;base64,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)
maths-General
Maths-
If
then
If
then
Maths-General
physics-
The length of a rectangular plate is measured by a meter scale and is found to be 10.0 cm. Its width is measured by vermier callipers as 1.00 cm. The least count of the meter scale and varmier callipers are 0.1cm and 0.01cm respectively (Obviously). Maximum permissible error in area measurement is
The length of a rectangular plate is measured by a meter scale and is found to be 10.0 cm. Its width is measured by vermier callipers as 1.00 cm. The least count of the meter scale and varmier callipers are 0.1cm and 0.01cm respectively (Obviously). Maximum permissible error in area measurement is
physics-General
physics-
A plane electromagnetic wave propagating in the x-direction has a wavelength of 60 mm. The electric field is in the y-direction and its maximum magnitude is 33Vm-1 The equation for the electric field as function of x and t is
A plane electromagnetic wave propagating in the x-direction has a wavelength of 60 mm. The electric field is in the y-direction and its maximum magnitude is 33Vm-1 The equation for the electric field as function of x and t is
physics-General
physics-
A plane electromagnetic wave of frequency 40 MHz travels in free space in the X-direction. At some point and at some instant, the electric field
has its maximum value of 750 N/C in Y-direction The wavelength of the wave is
A plane electromagnetic wave of frequency 40 MHz travels in free space in the X-direction. At some point and at some instant, the electric field
has its maximum value of 750 N/C in Y-direction The wavelength of the wave is
physics-General
physics-
A flood light is covered with a filter that transmits red light. The electric field of the emerging beam is represented by a sinusoidal plane wave
The average intensity of the sun will be
A flood light is covered with a filter that transmits red light. The electric field of the emerging beam is represented by a sinusoidal plane wave
The average intensity of the sun will be
physics-General
physics-
A lamp emits monochromatic green light uniformly in all directions. The lamp is 3% efficient in converting electrical power to electromagnetic waves and consumes 100W of power. The amplitude of the electric field associated with the electromagnetic radiation at a distance of 10m from the lamp will be -
A lamp emits monochromatic green light uniformly in all directions. The lamp is 3% efficient in converting electrical power to electromagnetic waves and consumes 100W of power. The amplitude of the electric field associated with the electromagnetic radiation at a distance of 10m from the lamp will be -
physics-General
physics-
An electric field of 300V/m is confined to a circular area 10 cm in diameter. If the field is increasing at the rate of 20V/m-s, the magnitude of magnetic field at a point 15cm from the centre of the circle will be
An electric field of 300V/m is confined to a circular area 10 cm in diameter. If the field is increasing at the rate of 20V/m-s, the magnitude of magnetic field at a point 15cm from the centre of the circle will be
physics-General
physics-
The sun delivers 103 W/m2 of electromagnetic flux to the earth’s surface. The total power that is incident on a roof of dimensions 8m´20m is 1.6´105 W the radiation force on the roof will be -
The sun delivers 103 W/m2 of electromagnetic flux to the earth’s surface. The total power that is incident on a roof of dimensions 8m´20m is 1.6´105 W the radiation force on the roof will be -
physics-General
physics-
The sun delivers 103W/m2 of electromagnetic flux to the earth’s surface. The total power that is incident on a roof of dimensions 8m´20m, will be -
The sun delivers 103W/m2 of electromagnetic flux to the earth’s surface. The total power that is incident on a roof of dimensions 8m´20m, will be -
physics-General
physics-
To establish an instantaneous displacement current of 2A in the space between two parallel plates of1mF capacitor, the potential difference across the capacitor plates will have to be changed at the rate of
To establish an instantaneous displacement current of 2A in the space between two parallel plates of1mF capacitor, the potential difference across the capacitor plates will have to be changed at the rate of
physics-General
physics-
A long straight wire of resistance R, radius ‘a’ and length ‘l’ carries a constant current ‘I’. The pointing vector for the wire will be
A long straight wire of resistance R, radius ‘a’ and length ‘l’ carries a constant current ‘I’. The pointing vector for the wire will be
physics-General