Tag Archives: Peekaboo Trail
My wife and I are heading to Moab at the end of April for a week of hiking in Canyonlands and Arches. We’re excited about the trip; it’s our first to that area. We are dayhikers, but we’re not afraid of mileage. (The Highline Trail from Logan Pass down to Swiftcurrent Pass in Glacier National Park was one the most enjoyable days we’ve had in the national park system.)
I’ve been weighing our many options for hikes and I have a question: What are the must-do dayhikes in Arches and Canyonlands? Continue reading →
By Michael Lanza
The best-known dayhikes in America’s national parks are certainly worth adding to your outdoor-adventure CV. Summits and hiking trails like Angels Landing in Zion, Half Dome in Yosemite, the North Rim Trail overlooking the Grand Canyon of the Yellowstone River, Glacier National Park’s Highline Trail, and many others represent the highlights of the crown jewels of the National Park System. But for that very reason, unless you take those hikes outside the peak seasons or times of day, you can expect to encounter a lot of other hikers.
But there are other national park dayhikes that remain off the radar of many hikers—so they attract a small fraction of the number of people flocking to the popular trails. On these 12 hikes, you’ll find scenery just as majestic as those famous trails, while possibly having these spots to yourself (as I did on several of them). Continue reading →
By Michael Lanza
We follow a zigzagging line of stone cairns over waves of slickrock in the backcountry of the Needles District of Utah’s Canyonlands National Park. Cliffs and 300-foot-tall sandstone candlesticks tower around us, in more shades of red than Crayola has yet replicated, glowing in the warm afternoon sunshine of late March. Five adults and four kids from three families, we traverse slabs, scramble in single file up the smooth, dry bottom of a narrow water runnel, and pump out calf muscles walking straight up steep ramps. In the desert Southwest, trails haven’t learned the axiom of Euclidian geometry that the shortest distance between two points is a straight line. We’re navigating a maze without walls. Continue reading →