Mathematics
Grade-3-
Easy
Question
The fraction of the unshaded parts in the diagram is ____________.
![](data:image/png;base64,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)
- 1
![2 over 4](data:image/png;base64,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)
![1 fourth](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAGxJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYr8KFGDPEA8TVqGDQTiJMpNcgaiPdSWiaxAfElIJan1KAOIM6htJTUA+Kj1ChuTwKxCjUMommOH2J1GwCVNzk6FQ24cQAAAGJ0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWZyYWM+PG1uPjE8L21uPjxtbj40PC9tbj48L21mcmFjPjwvbWF0aD7CA6ZrAAAAAElFTkSuQmCC)
![3 over 4](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAMhJREFUeNpjYMAOHIF4GxB/A+IfQHwLiCcAsTADiWA/EAcBMRuSmAEQ72CgEvhEDUOUgPgGJQaIA3EiNJy8yDHgPxouoNRLgkAcAMQngdieGmHEAzWMKuAHNQzRgwY4SeAgEIcCMQsQM0FT+n0gjifVIFsg3gL1yg9oSvdhGAWDD/wnE4+CwQp8qBFDoALtGjUMmgnEyZQaZA3Ee5ESLFkAVMteAmJ5Sg3qAOIctCxEVvl8FEteJBmAqh0VahhE0xxPtSKDPgYBAOndQOeHDOZqAAAAYnRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtZnJhYz48bW4+MzwvbW4+PG1uPjQ8L21uPjwvbWZyYWM+PC9tYXRoPt/Md8kAAAAASUVORK5CYII=)
The correct answer is: ![1 fourth](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAGxJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYr8KFGDPEA8TVqGDQTiJMpNcgaiPdSWiaxAfElIJan1KAOIM6htJTUA+Kj1ChuTwKxCjUMommOH2J1GwCVNzk6FQ24cQAAAGJ0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWZyYWM+PG1uPjE8L21uPjxtbj40PC9tbj48L21mcmFjPjwvbWF0aD7CA6ZrAAAAAElFTkSuQmCC)
to find - the fraction of unshaded parts
In the given shape, 1 part out of 4 parts is not shaded.
fraction of unshaded parts = number of unshaded parts / total number of parts
Therefore, fraction is ![1 fourth](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAGxJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYr8KFGDPEA8TVqGDQTiJMpNcgaiPdSWiaxAfElIJan1KAOIM6htJTUA+Kj1ChuTwKxCjUMommOH2J1GwCVNzk6FQ24cQAAAGJ0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWZyYWM+PG1uPjE8L21uPjxtbj40PC9tbj48L21mcmFjPjwvbWF0aD7CA6ZrAAAAAElFTkSuQmCC)
In the given shape, the fraction of unshaded parts is .