1.If from the point P(f,g,h)P(f,g,h)P(f,g,h) perpendiculars PLPLPL, PMPMPM are drawn to the yzyzyz-plane and zxzxzx-plane respectively, then the equation of the plane OLMOLMOLM (where OOO is the origin) isa.xf+yg+zh=0\displaystyle \frac{x}{f}+\frac{y}{g}+\frac{z}{h}=0fx+gy+hz=0b.xf+yg−zh=0\displaystyle \frac{x}{f}+\frac{y}{g}-\frac{z}{h}=0fx+gy−hz=0c.xf−yg+zh=0\displaystyle \frac{x}{f}-\frac{y}{g}+\frac{z}{h}=0fx−gy+hz=0d.−xf+yg+zh=0\displaystyle -\frac{x}{f}+\frac{y}{g}+\frac{z}{h}=0−fx+gy+hz=0Login to continueOnly logged in users canattempt or see the solution.